tag:blogger.com,1999:blog-72296871385168992242024-03-14T10:07:56.962-07:00AstroJJEJJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.comBlogger15125tag:blogger.com,1999:blog-7229687138516899224.post-60966500052854217412019-12-29T16:50:00.002-08:002019-12-30T10:54:14.350-08:00JJ's 2019 in review...<div class="MsoNormal" style="background-color: white; color: #444444; font-family: arial, tahoma, helvetica, freesans, sans-serif;">
<span style="font-size: small;">Well 2019 was okay? I did feel overwhelmed with work load at times but this was just because I was in the state of having too many different things to do at times it was difficult to work out which one to do first! While I haven't been as productive as I think I should have been I have been productive. I've also been able to recover still from 2016/7 that were too busy and stressful. I know I just need to try to not overwork or expect too much of myself again. And I definitely need to be more active, I do a lot of walking everyday but need to do more fun exercise.</span></div>
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<span style="font-size: small;">In terms of family life that was really the priority this year and another reason I was most stressed at times is a I put being a parent first while also trying to do all my work. This led to working 7 days a week, catching up at the weekends with everything I didn't get done during the week.</span></div>
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<span style="font-size: small;">But on the other hand the big thing that happened this year is that I applied for promotion to an Associate Professor, which I was successful in! So this just means I need to keep going as I'm doing something right. </span></div>
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<span style="font-size: small;">Anyway her is my highlights of the year! And I've probably forgotten something!</span></div>
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<span style="font-size: small;">Anyway things I’ve done in <b><u>research</u></b>. First I’ve been on 6 (+1) refereed (submitted) articles this year:</span></div>
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<li style="border: none; color: #444444; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;">Three first author <span style="font-size: small;">papers:<span style="font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span></span></li>
<ul>
<li style="border: none; color: #444444; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;"><span style="font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;">Eldridge & Xiao,<i> The distance, supernova rate, and supernova progenitors of NGC6946</i>, </span><a href="https://arxiv.org/pdf/1903.00173.pdf">https://arxiv.org/pdf/1903.00173.pdf</a></span></li>
<li style="border: none; color: #444444; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;"><span style="font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;">Eldridge et al, <i>Supernova lightCURVE POPulation Synthesis II: Validation against supernovae with an observed progenito</i>r, </span><a href="https://arxiv.org/pdf/1908.07762.pdf">https://arxiv.org/pdf/1908.07762.pdf</a></span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;"><span style="color: #444444;"><span style="font-size: small;">Eldridge et a</span>l., <i>Weighing in on black hole binaries with BPASS: LB-1 does not contain a 70M(Sun) black hole</i>, </span><a href="https://arxiv.org/pdf/1912.03599.pdf" style="color: #444444;">https://arxiv.org/pdf/1912.03599.pdf</a><span style="color: #444444;"> </span><span style="color: red;">[Note - currently only submitted but so proud of it, especially as it's a strong team effort, decided to include it! :o) ].</span></span></li>
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<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;">Student/close collaborator papers:</span></li>
<ul>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;">Gilkis, Vink, Eldridge & Tout, <i>Effects of winds on the leftover hydrogen in massive stars following Roche lobe overflow</i>, <a href="https://arxiv.org/pdf/1904.09221.pdf">https://arxiv.org/pdf/1904.09221.pdf</a></span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;">Schady et al., <i>The 50-100 pc scale parent stellar populations of Type II supernovae and limitations of single star evolution models</i>, <a href="https://arxiv.org/pdf/1907.12260.pdf">https://arxiv.org/pdf/1907.12260.pdf</a></span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;">Chrimes, Stanway & Eldridge, <i>Binary population synthesis models for core-collapse gamma-ray burst progenitors</i>, <a href="https://arxiv.org/pdf/1911.08387.pdf">https://arxiv.org/pdf/1911.08387.pdf</a></span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;">Tang et al.,<i> Dependence of Gravitational Wave Transient Rates on Cosmic Star Formation and Metallicity Evolution History</i>, <a href="https://arxiv.org/pdf/1912.04474.pdf">https://arxiv.org/pdf/1912.04474.pdf</a></span></li>
</ul>
<li><span style="font-size: small;">I'm quite proud of all these papers but Petra Tang's letter on the GW transient event rate deserves a special mention as it's her first paper and the result of her masters thesis work. </span></li>
</ul>
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<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;"><span style="text-indent: -18pt;">Attended the Space Telescope Institute Spring Symposium meeting in Baltimore, USA. </span><a href="https://cloudproject.hosted.panopto.com/Panopto/Pages/Viewer.aspx?id=15b2b77e-6ba2-4f05-ad61-aa3800de38c4">https://cloudproject.hosted.panopto.com/Panopto/Pages/Viewer.aspx?id=15b2b77e-6ba2-4f05-ad61-aa3800de38c4</a></span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="text-indent: -18pt;">Attended the Fifty-One Erg meeting in North Carolina, USA.</span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="text-indent: -18pt;">Attended the Stars in Monash meeting in Melbourne, Australia.</span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;">Recruited a post-doc, Dr Heloise Stevance, who has already begun work using BPASS to study galaxies and more! (See <a href="https://heloises.github.io/hoki/">https://heloises.github.io/hoki/</a>).</span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;">Also recruited a PhD student who should make it to Auckland in 2020!</span></li>
</ul>
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<span style="font-size: small;"><span style="background-color: white; color: #444444; font-family: "arial" , "tahoma" , "helvetica" , "freesans" , sans-serif;">Things I’ve done in </span><b style="background-color: white; color: #444444; font-family: arial, tahoma, helvetica, freesans, sans-serif;"><u>Teaching</u></b></span><br />
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<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="text-indent: -18pt;">Won the Faculty of Science award for sustained excellence in teaching!</span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="text-indent: -18pt;">Had a second student, John Bray, go through their graduation ceremony!</span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;"><span style="text-indent: -18pt;">Lectured the 1st</span><span style="text-indent: -18pt;"> year astronomy course twice again which went well but improvements still to be made.</span></span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="text-indent: -18pt;">Also lectured 2nd year quantum mechanics for the first time. Was quite stressful and I learnt a lot but it was fun in the end.</span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="text-indent: -18pt;">Taught 1 honors project student and 2 masters student.</span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="text-indent: -18pt;">Was "deputy head academic" for first half of the year. This was interesting and contributing to the broader development of teaching across the Faculty of Science. This was a significant time load, especially in putting together course descriptions and amendments as well as creating entirely new courses. But it was a positive experience and unfortunately means I'll probably end up doing the job in a few years.</span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="text-indent: -18pt;">Also a big thing is I lectured as myself consistently for most of my lectures this year. This is a small step but my lecturing was so much better because of it.</span></li>
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<span style="font-size: small;">Things I’ve done in <b><u>Service & Leadership</u><o:p></o:p></b></span></div>
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<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;">Again this year I didn't do as much as I have in previous years but then there hasn't been the need. Although looking ahead to next year I can see more work that needs to be done.</span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;">Didn't give many public talks this year but did give one in North Carolina with Katie Mack! (@AstroKatie from twitter) about the different ways the Universe can kill us.</span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;">Helped on the steering committee for the "Our World Our Universe" faculty research theme. Also recorded this interview describing my science: <a href="https://www.youtube.com/watch?v=b9eFWbjd1Kw">https://www.youtube.com/watch?v=b9eFWbjd1Kw</a></span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;">Had a radio interview with Damian Christie as part of a show on "Where do I come from?" <a href="https://www.rnz.co.nz/national/programmes/ourchangingworld/audio/2018726643/origins-the-big-bang-human-evolution-and-polynesian-migrations">https://www.rnz.co.nz/national/programmes/ourchangingworld/audio/2018726643/origins-the-big-bang-human-evolution-and-polynesian-migrations</a></span></li>
<li style="border: none; margin: 0px 0px 0.25em; padding: 0.25em 0px;"><span style="font-size: small;">Again a member of the ASA IDEA committee and helped work out who gets the Pleiades awards! <a href="https://asa-idea.org/">https://asa-idea.org/</a></span></li>
</ul>
JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com0tag:blogger.com,1999:blog-7229687138516899224.post-66845239608825642452018-12-08T00:39:00.000-08:002018-12-30T21:59:54.846-08:00JJ's 2018 in review...<br />
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So 2018… it wasn’t as busy nor as stressful as 2016 and 2017
were. I finally listened to what I was writing! I didn’t necessarily say no so
many times to things but ran out of energy and motivation to do many things,
which has had some negative impacts on the amount of stuff I’ve done. I’ve also
just had many fewer requests for things this year. So, all in all I’ve got to
the end of the year with a list of things I could/should have done but didn’t,
but I’m not completely stressed out and exhausted. I’ve still got to improve my
fitness and that will help with my productivity, but this is good and I can
move forward for sure.</div>
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Also it’s worth nothing I’ve tried again this year to be a
good parent and partner. This is always difficult as anything in life.
Especially as I’m also trying to come to understand myself – which is also still
difficult – think I’m starting to know who I am but working out how to fit that
into life and not impact those I love most.<o:p></o:p></div>
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Anyway things I’ve done in <b style="mso-bidi-font-weight: normal;"><u>research</u></b>. First I’ve been on 9 articles this year:</div>
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<li>Two first author papers:<span style="font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></li>
<ul>
<li><span style="text-indent: -18pt;">Eldridge, Stanway & Tang, </span><i style="text-indent: -18pt;">A consistent estimate for gravitational wave
and electromagnetic transient rates, <a href="http://adsabs.harvard.edu/abs/2019MNRAS.482..870E">http://adsabs.harvard.edu/abs/2019MNRAS.482..870E</a></i></li>
<li>Eldridge, Xiao, Stanway, Rodrigues, Guo, <i style="text-indent: -18pt;">Supernova lightCURVE POPulation Synthesis I:
including interacting binaries is key to understanding the diversity of type II
supernova lightcurves</i><span style="text-indent: -18pt;">, </span><a href="http://adsabs.harvard.edu/abs/2018arXiv181100282E" style="text-indent: -18pt;">http://adsabs.harvard.edu/abs/2018arXiv181100282E</a><span style="text-indent: -18pt;">
(PASA in press).</span></li>
</ul>
<li style="text-indent: -24px;"> Author on one research note:</li>
<ul>
<li style="text-indent: -24px;"> Eldridge, Tang, Bray & Stanway, <i>On the Chirp Mass Distribution of Stellar Origin Gravitational-wave Events, </i><a href="http://iopscience.iop.org/article/10.3847/2515-5172/aafa14">http://iopscience.iop.org/article/10.3847/2515-5172/aafa14</a></li>
</ul>
<li>Student/close collaborator papers:</li>
<ul>
<li>Xiao et al., <i style="text-indent: -18pt;">Emission-line
diagnostics of nearby H II regions including interacting binary populations</i><span style="text-indent: -18pt;">,
</span><a href="http://adsabs.harvard.edu/abs/2018MNRAS.477..904X" style="text-indent: -18pt;">http://adsabs.harvard.edu/abs/2018MNRAS.477..904X</a></li>
<li>Stanway & Eldridge, <i style="text-indent: -18pt;">Re-evaluating old stellar populations</i><span style="text-indent: -18pt;">, </span><a href="http://adsabs.harvard.edu/abs/2018MNRAS.479...75S" style="text-indent: -18pt;">http://adsabs.harvard.edu/abs/2018MNRAS.479...75S</a></li>
<li>Bray & Eldridge, <i style="text-indent: -18pt;">Neutron star kicks - II. Revision and further testing of the
conservation of momentum `kick' model</i><span style="text-indent: -18pt;">, </span><a href="http://adsabs.harvard.edu/abs/2018MNRAS.480.5657B" style="text-indent: -18pt;">http://adsabs.harvard.edu/abs/2018MNRAS.480.5657B</a></li>
<li>Xiao et al., <i style="text-indent: -18pt;">Core-collapse
supernovae ages and metallicities from emission-line diagnostics of nearby
stellar populations</i><span style="text-indent: -18pt;">, </span><a href="http://adsabs.harvard.edu/abs/2019MNRAS.482..384X" style="text-indent: -18pt;">http://adsabs.harvard.edu/abs/2019MNRAS.482..384X</a></li>
<li>Stanway & Eldridge, <i style="text-indent: -18pt;">Initial Mass Function Variations Cannot Explain the Ionizing Spectrum
of Low Metallicity Starbursts</i><span style="text-indent: -18pt;">, </span><a href="http://adsabs.harvard.edu/abs/2018arXiv181103856S" style="text-indent: -18pt;">http://adsabs.harvard.edu/abs/2018arXiv181103856S</a></li>
</ul>
<li><span style="text-indent: -18pt;">Other papers:</span></li>
<ul>
<li><span style="text-indent: -18pt;">Farrell et al., Impact of binary interaction on
the evolution of blue supergiants, </span><a href="http://adsabs.harvard.edu/abs/2018arXiv181001830F" style="text-indent: -18pt;">http://adsabs.harvard.edu/abs/2018arXiv181001830F</a></li>
</ul>
<li><span style="text-indent: -18pt;">Written two book chapters, one on the impact of
binaries and another on star-formation although they won’t be published until
next year.</span></li>
<li><span style="text-indent: -18pt;">Attended the Astronomical Society of Australia’s
Annual Science meeting and gave a talk.</span></li>
<li><span style="text-indent: -18pt;">Attended the MESA summer school and learnt
sooooo much about this new stellar evolution code.</span></li>
<li><span style="text-indent: -18pt;">Visited the University of Canterbury to give a
talk.</span></li>
<li>Had a sabbatical and travelled to/talked at:</li>
<ul>
<li><span style="text-indent: -18pt;">UNSW Canberra</span></li>
<li><span style="text-indent: -18pt;">ANU Mount Stromlo</span></li>
<li>NASA Goddard</li>
<li>University of Warwick</li>
<li>University of Amsterdam</li>
<li>Leuven University</li>
<li>Open University, in Milton Keynes</li>
<li>University of Sussex</li>
</ul>
<li>Also research featured in the NZ Herald 3 times!</li>
<ul>
<li><span style="color: #618eba; font-family: "noto serif" , serif; font-size: 11.5pt; text-indent: -18pt;"><a href="https://www.nzherald.co.nz/nz/news/article.cfm?c_id=1&objectid=11960505" style="font-family: "Noto Serif", serif; font-size: 11.5pt; text-indent: -18pt;">Science Made
Simple: JJ Eldridge on binary stars</a></span></li>
<li><span style="color: #618eba; font-family: "noto serif" , serif; font-size: 11.5pt; text-indent: -18pt;"><a href="https://www.nzherald.co.nz/nz/news/article.cfm?c_id=1&objectid=12064963" style="font-family: "Noto Serif", serif; font-size: 11.5pt; text-indent: -18pt;">Stellar
discovery could prompt a rethink on the universe</a></span></li>
<li><span style="color: #618eba; font-family: "noto serif" , serif; font-size: 11.5pt; text-indent: -18pt;"><a href="https://www.nzherald.co.nz/nz/news/article.cfm?c_id=1&objectid=12172001" style="font-family: "Noto Serif", serif; font-size: 11.5pt; text-indent: -18pt;">NZ study could
help the hunt for Einstein’s cosmic ripples</a></span></li>
</ul>
<li>Won a Marsden grant to pay for 3 years of research,
including a post-doc and a PhD student and my time and travel. Wow, after >15
times of trying.</li>
</ul>
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Things I’ve done in <b><u>Teaching</u></b><br />
<ul>
<li><span style="text-indent: -18pt;">Had one student, Lin Xiao, go through their
graduation ceremony!</span></li>
<li><span style="text-indent: -18pt;">Had another student, John Bray, pass his viava!</span></li>
<li><span style="text-indent: -18pt;">Only lectured on course, 1</span><sup style="text-indent: -18pt;">st</sup><span style="text-indent: -18pt;"> year
astronomy which went well, despite some administrative mistakes, but it’s
important to learn from those.</span></li>
<li>Finished the text book on the structure and
evolution of stars I’ve written with Chris Tout! (Link here: <a href="https://www.worldscientific.com/worldscibooks/10.1142/p974" style="text-indent: -18pt;"><span style="background: white; color: #618eba; font-family: "noto serif" , serif; font-size: 11.5pt; line-height: 107%;">World
Scientific Press</span></a><span style="background: white; color: #4c4c4c; font-family: "noto serif" , serif; font-size: 11.5pt; line-height: 107%; text-indent: -18pt;">).</span></li>
<li><span style="text-indent: -18pt;">Observing my 2</span><sup style="text-indent: -18pt;">nd</sup><span style="text-indent: -18pt;"> year redesign from a
few years ago really seems to be going well.</span></li>
<li><span style="text-indent: -18pt;">Taught 4 honors project students and 1 masters
student.</span></li>
<li><span style="text-indent: -18pt;">Ended a student project.</span></li>
</ul>
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Things I’ve done in <b style="mso-bidi-font-weight: normal;"><u>Service
& Leadership</u><o:p></o:p></b></div>
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<ul>
<li>Unfortunately, this year I’ve just had not enough energy to
do enough in this space this year and that makes me sad. But I guess it
balances with needing a break and trying to get research done. This is something I really see as a failure as there are so many things I should have done.</li>
<li><span style="text-indent: -18pt;">Trans on Campus, had some meetings and did some work
with the University giving feedback on transition at work, trans and sporting
and travelling guidelines. This needs more effort next year!</span></li>
<li><span style="text-indent: -18pt;">Rainbow science was also very quiet, but there
are a few new interested people around, so we might be able to get it busy
again.</span></li>
<li><span style="text-indent: -18pt;">Was nominated as NZ LGBTI Hero – a controversial
event but a fun evening at least.</span></li>
<li><span style="text-indent: -18pt;">Public talks at continuing education groups in
Te Awa Mutu and Thames. The latter was my first talk as myself. Also just about
to give a talk at Stardome to the Auckland Astronomical Society. As well as
talks at RASNZ annual meeting, Hidden perspectives seminars and for a trans
group in London.</span></li>
<li><span style="text-indent: -18pt;">Curated the Real Scientists account for a week, wow that was fun and busy!</span></li>
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<br />JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com0tag:blogger.com,1999:blog-7229687138516899224.post-79020078919161691072018-11-29T15:20:00.001-08:002018-11-29T15:20:11.194-08:00School question time!<div class="gmail_default" style="background-color: white; color: #212121; font-family: georgia, serif; font-size: 15px;">
So I just had some questions on twitter and via email from school children about astronomy. So rather than just replying to the people in question I thought I'd put the answers in a blogpost so everyone can read them.</div>
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<span style="color: #212121; font-family: georgia, serif;"><span style="font-size: 15px;"><b>Set one:</b></span></span></div>
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<span style="color: #212121; font-family: georgia, serif;"><span style="font-size: 15px;"><b>Q1 "What would happen if two red giants collided?" - context is discussions about neutron stars colliding and forming a black hole</b></span></span></div>
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This happens sometimes in binary stars systems where two stars orbit around one another. If their masses are similar enough they can both become red giants at the same time, grow in radius and eventually touch. To work out what will happen we need to think about the structure of a red giant. In the center is the star's helium core, the remnants of it fusing hydrogen to helium over it's main sequence lifetime (i.e. the phase our Sun is in). The core is then surrounded by the hydrogen envelope that is the material that wasns't hot enough to burn during the main sequence. </div>
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Then in a binary when the two red giants touch one of two things will happen, either they will merge, losing some of the hydrogen and making a supersized helium core. Or all the hydrogen will be removed and the two helium cores will orbit each other in a much shorter orbit. If these are close enough they may eventually merge as they emit gravitational radiation and explode in some way.</div>
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If the helium cores were big enough then supernovae might happen and the stars could eventually become neutron stars or black holes and then eventually also merge via gravitational radiation to cause a GW event. Especially in the case where the two stars touching results in the orbit shrinking so the stars are closer together. If they're closer together they'll merge more quickly.</div>
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It's also worth noting it's very rare for the two stars to both become red giants at the same time. More typically one star will become a red giant while the other in still a main sequence star. But we're pretty sure they must touch and interact strongly to get close enough to form GW events.</div>
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Finally two single stars might me moving around a star cluster and just bump into each other. The same two possible results apply but this would be even rarer as space is big and stars are small.</div>
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<span style="color: #212121; font-family: georgia, serif;"><span style="font-size: 15px;"><b>Q2 - " Is Betelgeuse the only red giant we can see in the night sky? How soon can we expect to see a supernova?"</b></span></span></div>
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There are many red giants/supergiants we can see in the sky, for example: Betelgeuse, Aldebaran, Antares and Arcturus. Also a star atlas will definitely contain many more. It's worth noting that many red giants won't go supernova, only those that were more massive than 8 times that of the Sun will explode. Betelgeuse is likely to be above that mass but we really can be sure about when it'll explode as we can't see inside it. It could explode tomorrow or in a few 100,000 years, so we just need to play a waiting game!</div>
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We do see many red supergiants explode in other nearby galaxies and they're 60% of all supernovae we see. It's just within our own Galaxy we can only expect 1 supernova every 50 to 100 years.</div>
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<span style="color: #212121; font-family: georgia, serif;"><span style="font-size: 15px;"><b>Q3 - Could the stuff thrown off a supernova go and form another star?</b></span></span></div>
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Yes, that's where all the iron in your blood game from as well as many (but not all) the elements in your body that aren't hydrogen came from. The iron comes mostly from a specific type of SN, type Ia which is from exploding white dwarf stars in a binary star. </div>
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What happens is the material formed in the explosion gets through out to get mixed with the material surrounding the star making it richer in heavier elements. We can actually see in more and more distant galaxies that there are less and less heavy elements showing us in reverse how stars have built up all the elements over 13.7 billion years.</div>
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<b>Set two:</b></div>
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<b>1. Do you believe we will get to Mars by 2030?</b></div>
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We've been there since the 1960s with space probes so I guess you mean humans. My only answer is maybe. It depends on whether there is the political will to spend that large amount of money that such a large project will require. We could get there before 2030 if we wanted to. Also the other question is whether it is a one-way trip or a return journey. The latter is more tricky.</div>
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<b>2. Do you believe there is currently life on Mars?</b></div>
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It's certainly possible but unlikely. Although life on Earth has been found in increasingly extreme environments. This is why it's key to go there and at least check whether there is or ever has been life there.</div>
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<b>3. Do you believe we could possibly live on Mars in the future?</b></div>
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It would be hard, recent research has suggested it may be even more difficult to terraform Mars than we thought. There is only a very sparse atmosphere so people will need to use spacesuits and pressure domes to live in and will not be able to walk through the open air on Mars.</div>
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Then there is also the problem that the planet has no magnetic field so people would have to live underground rather than on the surface. This is to avoid the solar wind and cosmic rates that are dangerous to life.</div>
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So again it's certainly possible just really, really difficult. </div>
JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com0tag:blogger.com,1999:blog-7229687138516899224.post-31868221284399152492018-10-08T22:47:00.001-07:002018-10-08T23:05:45.527-07:00What the 13th Doctor means to me...So I’ve been meaning to write a short blogpost about what it means as a trans person to see the Doctor change sex and gender. I mean it’s been on the cards for some time now with the Mistress/Master leading to the casting of Jodie Whittaker as the 13th Doctor. My first reaction upon learning this months ago was “hey the Doctor is going to go through the same thing I’m kinda going through”.<br />
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As a quick aside it’s worth noting that I am not going to say the Doctor is trans, they’re not they are cisgender. Why? Well we’re talking about aliens here and I’ve got an entire set of blogposts that I need to write about gender and sci-fi but for Timelords we have to treat the fact that a regeneration is like a rebirth (based on this talk here: <a href="https://www.youtube.com/watch?v=SAMiWRi7_Yo">https://www.youtube.com/watch?v=SAMiWRi7_Yo</a>). So while for cisgender humans their sex assigned at birth and gender align, the equivalent for Timelords is that their sex at regeneration and their gender align. This does of course reinforce the idea that sex and gender are both binary which they’re not, for humans at least, but anyway this is the topic for another blogpost not this one, also there are probably intersex regenerations but if it’s a rate of 1% as for humans then we probably have seen enough Timelord characters to know. <br />
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a few friends used to jokingly say I did remind people of the 10th Doctor and I may be listened to them too closely, also it was a time when I was still male. But then when the 10th Doctor left it was around the time of my move to New Zealand and that’s when I really began to change and come to understand myself. This has lead me to my journey reaching a moment of me moving over to being more female. It’s a funny coincidence for me to see a character I associate with so strongly reflect my own change.<br />
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It’s worth noting that I’m a theoretical astrophysicist which is as close to being a Timelord as possible on Earth. I mean there is the understanding the Universe from one side to the other and running around showing young people the wonders it contains (i.e. lecture undergraduates and teach project students). (Un)fortunately there is a lot less running and no daleks or cybermen.<br />
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To not give away any spoilers, the Doctor is still the Doctor. There is that regeneration confusion when she’s still working out who she is but then the moment everything clicks it is as clear as day and I can’t wait to watch more. There is one quote though that I need to share when the Doctor explains her regeneration to her new companions, there are so many aspects of the description that parallel experiences of trans people:<br />
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Doctor: “<i>You should have seen me a few hours ago. My whole body’s changed. Every cell in my body burning. Some of them are still at it now, reordering, regenerating</i>”.<br />
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Grace: “<i>Sounds painful love</i>.”<br />
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Doctor: “Y<i>ou have no idea… there is this moment when you’re sure you’re about to die and then... you’re born, it’s terrifying. Right now I’m a stranger to myself, the’s echos of who I was, and a sort of call towards who I am and I have to hold my nerve and trust all these new instincts, shape myself towards them. I’ll be fine. In the end… hopefully… but I have to be cos you guys need help and if there’s one thing I’m certain of, when people need help I never refuse. Right! This is going to be fun.</i>”<br />
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Trans people when they transition in some ways do die, that’s why previous names are referred to as “deadnames”. We have to become reborn but then we have our previous lives still with us and we do have to move forwards and reinvent ourselves. There is so much to unlearn, so many habits we have to break that we've had to fit in and go undiscovered. To move forwards and reinvent ourselves we really have to trust instincts and thoughts that for so long we have suppressed to become the person we are.<br />
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Also personally I think the wanting to help people in trouble is what the Doctor is all about and it’s one of the things I like most.<br />
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So for me at least, and may be other transgender people seeing this change and seeing a popular character go through similar changes to us inspires us a little, who knows, to me at least it’s a big deal. </div>
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Anyway personally it’s strange to see past photos of me and remember times from so long ago. I don't hate them and there are aspects of my oldself that I hate but there is a lot I love about my oldself too. Now though I still don’t know where I’m going or who I’m going to be. I really hope it’ll be okay in the end.<br />
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Right, time to get on, think I’ll leave you with two last quotes, “Allons-y!” and I just hope my adventure is going to be “Brilliant!”</div>
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(And yes sorry this was a rush job but was just toooooooo excited). </div>
JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com1tag:blogger.com,1999:blog-7229687138516899224.post-10615807777079408632017-12-31T23:48:00.001-08:002018-01-01T00:23:53.145-08:00The Holdo ManeuverSo first, ***SPOILERS***, do not read on if you don't want to read a major spoiler about Star Wars: The Last Jedi.<br />
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Okay, it's been out for several weeks now but better to be safe than sorry!<br />
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Also quick disclaimer before going on, these are just my thoughts around the issue, I've got a PhD in astrophysics and have written about this stuff before (e.g. <a href="http://astrojje.blogspot.co.nz/2016/07/science-of-sci-fi-spaceflight.html">http://astrojje.blogspot.co.nz/2016/07/science-of-sci-fi-spaceflight.html</a>) read and watched more sci-fi than I probably should have and completed X-wing, TIE fighter and X-wing alliance, again, more times than I should have. So I do love Star Wars and really like thinking not of the problems with science fiction but with "how could they possibly happen".<br />
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Anyway, one of the main scenes in the movie is when Admiral Holdo takes the Mon Calamari cruiser "Raddus" and rams into Supreme Leader Snoke's ship by sending it to hyperdrive. The second I saw this I thought that it tells us something interesting about how this fictional hyperdrive works. After some thought and googling I found out many people were having similar thoughts, e.g. <a href="https://www.theringer.com/2017/12/20/16800970/vice-admiral-holdo-maneuver-the-last-jedi" target="_blank">https://www.theringer.com/2017/12/20/16800970/vice-admiral-holdo-maneuver-the-last-jedi </a><br />
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In case you're wondering what the aftermath looks like here's a link: <a href="https://cdn-images-1.medium.com/max/1600/1*fNvQQ4vnLNY6M_pnBsEEHw.png">https://cdn-images-1.medium.com/max/1600/1*fNvQQ4vnLNY6M_pnBsEEHw.png</a><br />
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But over doing the washing up I realised something, we've seen starship/starship collisions before. For example in Rogue One, <a href="https://www.youtube.com/watch?v=BZMepnUqpo8">https://www.youtube.com/watch?v=BZMepnUqpo8</a> where the collision between two Star Destroyers was "bad" for those ships.<br />
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Then even in Return of the Jedi there was the collision of a tiny little A-wing with a super-Star Destroyer (<a href="https://www.youtube.com/watch?v=lbsIUX2LoJQ">https://www.youtube.com/watch?v=lbsIUX2LoJQ</a>).<br />
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In both these cases the velocities weren't at "hyperspeed" but the collisions were still bad. In the latter case mainly because of the collision hitting the bridge of the Executor.<br />
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A lot of people seem to have latched onto the fact that the Holdo Maneuver is the first to occur at light speed. However when you look at the damage to the mega-ship, it doesn't look so bad. The ship didn't suddenly explode it was just cut through. This looks quite similar to the star destroyer-star destroyer collision but at higher speed.<br />
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So here is the sciency bit - why did Admirial Holdo go to lightspeed? It was to make the collision happen quickly rather than allowing time for the First Order to move out the way. The energy of the collision wasn't enhanced due to the lightspeed it was just the time of the collision changed. This fact suggests the hyperdrive in the Star Wars Universe doesn't warp space but time? Or both maybe? So how it allows an object to travel the same distance that would take minutes at sub-light speed in a fraction of a second. Thus when the cruiser collides with the First Order ship rather than taking minutes or seconds as we've seen before it takes fractions of a micro-second. The trailing wake of material from the explosion is then what hits the other destroys behind the mega-ship.<br />
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If you want an analogy: think along the lines of someone punching a watermelon (=sublight collision) compared to a sword being slashed at speed through a watermelon and cutting it in half (=hyperdrive speed collision). Same energy (as a person throws the punch or turns the sword) but the speed is different. Actually, thinking on this more, a lot of martial art breaking techniques are more about speed than strength... but that's another post....<br />
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Another sciency thing her is that it means by the way that the hyperdrive doesn't remove a ship from spacetime like say the TARDIS does in Dr Who. But it means that there must be a similar solution, that we don't know of, that is how to "disconnect" one bit of spacetime from another, change the passage of time in someway and then "reconnect" them later without problems (this is impossible in our current understanding of the Universe).<br />
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Anyway the good news is this removes some of the problems what people have pointed out about the collision, namely "why did no one think of doing this before?". Well first, they have, just not with the hyperdrive engaged. Also let's think about this, a cruiser is an expensive ship, even if it's really old and ready for scrap, using one up as a weapon wouldn't be cost effective. There are many better (more cost effective) weapons that could be deployed.<br />
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Also let's think about mass. A tiny little fighter is maybe, 10 or 20 tonnes? A modern aircraft carrier on the Earth is about 100,000 tonnes, lets guesstimate that the Mon Calamari cruise is 1,000,000 tonnes. That's why the collision is so destructive, it's got 500,000 times more mass in that collision than a tiny little fighter would have. And its going to be more often that a person in a fighter would ram another ship in desperation than having a large carrier ship with only one person on board to decide their own fate<br />
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Summary: the hyperdrive didn't add destructive power, it just meant the collision (which we know already to be destructive) to just happen much more quickly.<br />
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There are other things to bear in mind here why no one developed "hyperdrive suicide robot ships". I think this comes down to cost and how difficult it is to build hyperdrives. The original TIE fighters didn't have hyperdrives or even shields. Even in the prequels the jedi starfighters needed to hook up to a special hyperdrive attachment. Hyperdrives are probably either expensive or difficult to make, if they don't add any destructive power it is probably more cost effective to put your money into making a bigger bang for your bomb.<br />
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Also then there are the safe guards that hyperdrives have which stop you if there is a large mass nearby. (I've played X-Wing, TIE Fighter and X-wing Alliance and have died in a mission many times when a star destroyer has blocked my exit vector, grrrrr). But you can always override them because as the article above points out, and suggestions in cannon dialogue gives you a "bad feeling" about collisions in hyperdrive.<br />
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One last thought though, if the hyperdrive does change time somehow, it means there might be some equivalence between distance and time taken to travel that distance, there might only be one speed of hyperdrive. This means that when in "A New Hope" Han Solo talks about doing the Kessel run in 12 parsecs, that has some direct meaning to time, not necessarily time, although that's still a complex and loaded statemtent.<br />
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Anyway, don't panic, we didn't see any new destructive tactic in "The Last Jedi", just a way of speeding things up.JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com1tag:blogger.com,1999:blog-7229687138516899224.post-65130720248148131622017-12-26T13:27:00.000-08:002017-12-26T13:29:05.306-08:00JJ's 2017 in review.After writing a review like this last year I thought it'd be interesting to write another one!<br />
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Looking back to last year's review it was clear that in 2016 I thought I was working at my limit. This year I know I've gone way beyond that limit. Towards the end of the year I was almost unable to keep going. I was finding it impossible to find energy to start anything new and trouble keeping all the different streams of projects going through my mind. I don't think anything I did on it's own was too difficult but just the combination of multiple different projects was tough. Especially things way outside my comfort zone away from science research and teaching.<br />
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I could tell this work load did effect my family life too much. Being stressed and not having energy was a bad thing. Part of the issue was changes at home meaning that I needed to be home earlier than before which meant I had to try to be more efficient with my time and trying to juggle too many things.<br />
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Anyway, I survived and a number of things have been completed which means I don't need to worry about them any more. On the big plus side I did also get promoted to "Senior Lecturer above the bar" which is reward for doing so much work. While I still need to do more to get my next promotion in a few years it's good to already have a number of acomplishments. I just need to make sure I don't fill up my to-do list with more things that get in the way of research so much. Especially as I have a sabbatical second semester next year.<br />
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So anyway here is a (probably incomplete) list of everything I've done this year....<br />
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<b><u>Research:</u></b><br />
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<li>Published the BPASS instrument paper as joint 1st author: Binary Population and Spectral Synthesis Version 2.1: Construction, Observational Verification, and New Results<br /><a href="http://adsabs.harvard.edu/abs/2017PASA...34...58E">http://adsabs.harvard.edu/abs/2017PASA...34...58E</a></li>
<li>Completed the data release for BPASS v2.1 associated with the paper and put it on the code website <a href="http://bpass.auckland.ac.nz/">bpass.auckland.ac.nz</a></li>
<li>Contributed to another 8 accepted journal articles</li>
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<li>Investigating the diversity of supernovae type Iax: a MUSE and NOT spectroscopic study of their environments, Lyman et al,<br /><a href="http://adsabs.harvard.edu/abs/2018MNRAS.473.1359L">http://adsabs.harvard.edu/abs/2018MNRAS.473.1359L</a></li>
<li>Spatially Resolved MaNGA Observations of the Host Galaxy of Superluminous Supernova 2017egm, Chen et al.,<br /><a href="http://adsabs.harvard.edu/abs/2017ApJ...849L...4C">http://adsabs.harvard.edu/abs/2017ApJ...849L...4C</a></li>
<li>Radio observations confirm young stellar populations in local analogues to z ˜ 5 Lyman break galaxies, Greis et al.,<br /><a href="http://adsabs.harvard.edu/abs/2017MNRAS.470..489G">http://adsabs.harvard.edu/abs/2017MNRAS.470..489G</a></li>
<li>iPTF15eqv: Multiwavelength Exposé of a Peculiar Calcium-rich Transient, Milisavljevic et al.,<br /><a href="http://adsabs.harvard.edu/abs/2017ApJ...846...50M">http://adsabs.harvard.edu/abs/2017ApJ...846...50M</a></li>
<li>No evidence for Population III stars or a Direct Collapse Black Hole in the z = 6.6 Lyman-α emitter 'CR7', Bowler et al.,<br /><a href="http://adsabs.harvard.edu/abs/2017MNRAS.469..448B">http://adsabs.harvard.edu/abs/2017MNRAS.469..448B</a></li>
<li>Observational properties of massive black hole binary progenitors, Hainich et al., A&A in press,<br /><a href="http://adsabs.harvard.edu/abs/2017arXiv170701912H">http://adsabs.harvard.edu/abs/2017arXiv170701912H</a></li>
<li>Diffuse Galactic antimatter from faint thermonuclear supernovae in old stellar populations, Crocker et al.,<br /><a href="http://adsabs.harvard.edu/abs/2017NatAs...1E.135C">http://adsabs.harvard.edu/abs/2017NatAs...1E.135C</a></li>
<li>LOSS Revisited. I. Unraveling Correlations Between Supernova Rates and Galaxy Properties, as Measured in a Reanalysis of the Lick Observatory Supernova Search, Graur et al.,<br /><a href="http://adsabs.harvard.edu/abs/2017ApJ...837..120G">http://adsabs.harvard.edu/abs/2017ApJ...837..120G</a></li>
</ul>
<li>Invited talks at "Mock Perth: Challenges for Simulations in the Era of SKA and Large IFU Surveys" and The Impact of Binaries on Stellar Evolution" conferences in Australia and Germany respectively.</li>
<li>Carnegie Distinguished visitor, invited colloquium (funded two weeks visit to work at Carnegie Observatories, Pasadena, USA). (<a href="https://www.youtube.com/watch?v=iDh6yFjudIM">https://www.youtube.com/watch?v=iDh6yFjudIM</a>). Met lots of cool scientists and have some cunning plans for new science!</li>
<li>Finished chapter for the "Handbook of Supernova".</li>
<li>Begun work on BPASS v2.2.<br /></li>
</ul>
<b><u>Service (astronomy):</u></b><br />
<ul>
<li>Edited and published the proceedings for the IAU Symposium, #NZstars2016 which was run in 2016.</li>
<li>Took part in continuing discussions to set up Astro Aotearoa of research astronomers in NZ group. This led to the running of the first PhD summer school at Auckland run by myself with support from Nick Rattenbury and Richard Easther. Also the first science meeting which was also a success.</li>
<li>Won the Bronze Pleiades award for Auckland Physics Department in collaboration with the department’s equity working group. </li>
<li>More public outreach talks at Stardome and Thames.</li>
<li>Curated @astrotweeps for a week again.</li>
<li>Refereed lots and lots of papers again and was named one of Nature's referees of 2016.</li>
</ul>
<br />
<b><u>Service (University, Academia and wider):</u></b><br />
<ul>
<li>Continuing work for the rights of trans and gender diverse people at University and in Academia (e.g. <a href="http://astrojje.blogspot.co.nz/2017/06/moving-gender-beyond-binary-in-academia.html">http://astrojje.blogspot.co.nz/2017/06/moving-gender-beyond-binary-in-academia.html</a>).</li>
<li>Also working on Faculty and Departmental committees.</li>
</ul>
<br />
<b><u>Teaching:</u></b><br />
<ul>
<li>Oversaw the redesign and teaching of second year courses in department of physics. This year we concentrated on lectures and examples classes. It will take a few more years to get perfect but we definitely improved all the courses and the students did enjoy the courses and seems to have done better (we still need to look in detail). Next year we'll be restructuring and organizing the labs....</li>
<li>Taught 5 courses: 2x 1st year astro (36 lectures), 2nd year classical mechanics (24 lectures, 8 example classes), 3rd year astrophysics (11 lectures) and course coordinated 2nd year electromagnetism. Considering the 2nd yr mechanics and 3rd yr astro meant I had to write two new courses in the same semester it wasn't easy and was quite stressful, especially when I wasn't able to keep so many things in my head at the same time but I made is somehow.</li>
<li>Finished of the course in Academic Practice, scoring A- grade overall. Again having to do this on top of everything else was difficult. Especially since my project work concerned trans and gender diverse people in academia which meant a serious amount of challenging self-reflection that made me quite uncomfortable, but I did learn a lot about myself at least. I still need to submit one of these projects to an education journal for publication maybe....</li>
<li>My 1st University of Auckland PhD student, Dr Lin Xiao, submitted her thesis, and passed. She has now moved back to China to take up a post-doc and she is finishing papers on the unpublished work in her thesis.</li>
<li>I still have 2 other PhD students who are close to finishing and submitting their theses early next year. I also now have a MSc student who is progressing through her project well and she should finish early 2019.</li>
<li>I did also apply for a University teaching award, I was unsuccessful in this but I did have to put together a teaching portfolio that allowed me to look at my teaching in detail. It allowed me to being to try to understand what it is I do when teaching that seems to be successful. I'll work out what "it" is one day I hope.</li>
</ul>
JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com1tag:blogger.com,1999:blog-7229687138516899224.post-35325796616570387372017-10-16T10:54:00.002-07:002017-10-16T10:58:06.631-07:00We are all made of stardust but gold, silver and platinum are neutron stardust!GW170817/GRB170817A/SSS17a was the event many astrophysicists have been waiting for since LIGO made the first detection of gravitational waves in 2015. This time we didn’t just detect the gravitational waves from two merging neutron stars, but have also seen the associated gamma-rays, optical light and radio emission from the possible black hole and from the two exploding stars.<br />
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This new discovery shows again the importance of LIGO and VIRGO’s work over decades. The refinement of their highly sensitive work allows us to be able to detect these gravitational waves.<br />
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In addition, there have been a large number of dedicated astronomers that have been following up the fading afterglow of the merger. Again showing their practice over many years of following up transient events as quickly as possible have payed off. I offer huge congratulations to everyone that contributed to this stunning discovery. Especially to everyone who wrote and published those papers in the two months since discovery!<br />
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Neutron stars are quite different to the black holes that have been detected merging before. They are made of “stuff” so there is material we can see when they do collide. Neutron stars are formed when massive stars (that about 8 times more massive than our Sun) die, in their last gasp these stars crush all the material in their core down into a sphere 10km in radius. This releases a large amount of energy that makes a star explode in a supernova.<br />
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If the star was in a binary, and the binary wasn’t destroyed in the two supernovae that much have occurred to make the two neutron stars, then these two neutron stars will slowly orbit closer and closer together as they emit gravitational waves. This can take billions of years until they touch, merge and possibly form a black hole as we’ve seen in GW170817.<br />
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We don’t even know the full story yet. The observations are ongoing and only in the coming months and years will we really begin to fully understand how exciting this object is. The fact that we have so much information from so many different sources will allow us to piece together in a way we have never been able to before. It’s going to take a lot of time and a lot of effort!<br />
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This event alone has already answered questions on the nature and structure or neutron stars and confirms that merging neutron stars look like we’ve always expected them to, as a short gamma-ray burst and a type of explosion called a “kilonova”.<br />
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A short gamma-ray burst is a highly energetic burst of gamma-rays that have the same apparent energy as entire exploding star but spaced over a few seconds. While a kilonova is the explosion powered by the collision, making new heavy elements that are ejected extremely fast, some maybe at close to the speed of light!<br />
<br />
The observations of the kilonova, the explosive afterglow, also confirms something else. In the explosion we have seen evidence for large amount of heavy elements. These events mostly create elements such as gold, silver and platinum. In this event it’s likely that 100s or 1000s of Earth masses of gold and other elements were made. If the rate of neutron stars mergers is as high as we now think, these dying stars are now the source of most of these elements in the Universe.<br />
We’re all made of stardust, but gold, silver and platinum are made of neutron stardust!<br />
<br />
One funny thought is that in a Doctor Who story called “Revenge of the Cybermen”, there was a planet called “Voga” that was made entirely of gold. Since this is the one element that is lethal to the Cybermen they attempted to destroy the planet. Now after the observations around this event we know that solid-gold planets are not as unlikely as we might have thought before!<br />
<br />
Researchers in NZ have not played a role in the detection of this event but we are highly interested in gravitational waves. For example, at the University of Auckland Assoc. Prof. Renate Meyer has worked on the problem of extracting the faint gravitational waves signals from the much larger terrestrial signals that jostle the instrument, a problem that is like trying to hear a whispered conversation in a noisy room.<br />
<br />
While in my own group two students PhD student John Bray and MSc student Petra Tang are both working to predict from models what the rate of these events should be, this event is showing that our models need to be improved to match the high rate of such mergers we now expect in the Universe.<br />
The problem comes down to this, for two neutron stars to merge, the binary must have survived two supernovae, these are extremely destructive events. The stars musts also have remained close enough that the two stars only took a few days to orbit around one another. Otherwise the Universe is not old enough for the stars to merge via gravitational radiation. Modelling these in population synthesis depends on many uncertain bits of physics, but now merging neutron stars and black holes will give us a new tool to constrain the evolution of stars. That’s what makes me most excited!<br />
<br />JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com0tag:blogger.com,1999:blog-7229687138516899224.post-28150468350806415662017-06-17T17:47:00.002-07:002017-06-17T17:48:27.787-07:00Moving gender beyond the binary in academia: Improving academia for trans and gender diverse people and the positive benefits to all<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="font-family: arial; font-size: 11pt; font-weight: 700; white-space: pre-wrap;">Abstract</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Transgender and gender diverse (T&GD) people over the past few years have had an increasing profile in the public consciousness. In tertiary education it has become apparent that to give all students an equal chance to succeed in their studies, education providers must make changes to include T&GD students. Being transgender myself I have been working with staff and students at the University of Auckland with this aim. In this article I point out some of the common misconceptions concerning T&GD people. I then describe what it is like to be trans faculty before discussing obstacles in academia for T&GD persons and how these could be removed. I also highlight how making these changes bring benefits to all in academia.</span></div>
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<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Introduction</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Who am I? That’s a question everyone asks themselves at some point in their lives. The depth of the question varies. At one level it might be asking: am I a person who prefers tea or coffee? Another might be choosing career direction: am I a scientist or an orchestral composer? And at a foundational level, some people ask themselves whether they are male, female, neither, some combination or another gender entirely.</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">I am a Senior Lecturer at the University of Auckland and I am transgender. I identify as genderfluid, meaning that sometimes I both present and self-identify as male, at other times as female or somewhere inbetween</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. In recent years I have become increasingly open regarding my gender diversity and increasingly aware of the problems encountered by trans and gender diverse (T&GD) people at all levels of academia. This awareness has been gained by personal interaction and experience with T&GD students and by being openly trans</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> and interacting with other T&GD faculty on social media, particularly Twitter.</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">In this article I aim to provide an overview of the issues and obstacles that exist within academia for T&GD staff and students. I will illustrate these through using both the current literature and an autoethnographical discussion via the use of a specific Twitter thread</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> in which I asked ~1950 followers the following question: </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">"what do you find useful in me being open/out on twitter? What is the most useful thing you've learnt? Why is it important?"</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> The advantage of doing this was to gain exterior views on what being openly trans has meant to others.</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The vast majority of the population never give their gender a second thought. They are happy to align gender with the sex they were assigned at birth, referred to as being cisgender. Yet between 1.2 to 3.7% (Clark et al., 2014) of the population ask this question of themselves, sometimes multiple times every day. Their gender does not simply align with the sex they were assigned at birth or does not fit into the male and female gender binary. One way to visualize this is to consider the “Genderbread Person” created by Sam Killermann as shown in Figure 1. Gender identity and expression do not always directly link to that assigned by society based on sex at birth. Some T&GD people attempt to live as the gender that links to their sex. Many take steps to align their gender expression and sometimes their sex with their gender identity. This is commonly referred to as transitioning. It is important to understand that this does not have to include medical transitioning and does not have to include any surgical procedures. </span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Social expectations can feel to be savagely demanding of those who don’t fit them. In all cases, a person whose sex, gender identity and expression are not aligned are likely to face obstacles in their daily lives that most others do not experience. These include not being called by their preferred pronouns (e.g. he/she/they), not being able to use a public bathroom without harassment, inability to compete in sports or experiencing harassment while obtaining medical care and support. These can lead to an increased risk of suicide. Research shows that 20 to 50% of transgender and gender diverse people attempt suicide (Haas et al., 2014). Rates of self-harm are also high among this group (Clark et al., 2014; Miller & Grollman, 2015). However it is positive to note that those who are supported through successful transition have a greatly improved quality of life, similar to that of the general population (Gomez-Gil et al., 2012;Gorin-Lazard, 2012; Durwood, McLaughlin & Olson, 2017).</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Over the past few years awareness of these problems has risen, owing to an increasing profile of T&GD people, with examples in the media of high profile celebrities “coming-out” and T&GD characters being included in TV serials such as Transparent, Sense8 and Shortland Street. Research into how to include T&GD students in academia has started to grow in step with the increasing public profile. Studies range from explaining and covering some of the simple steps (Spade, 2011) to more detailed studies of the obstacles T&GD students encounter in tertiary education (Valentine, Wood & Plummer, 2009; Powell, 2016). These provide some idea of changes we should make in academia to become more inclusive. Studies undertaken in New Zealand are relatively recent. Powell (2016) looked in detail about T&GD student experiences in New Zealand tertiary education.</span></div>
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<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The status of research about LGBT (Lesbian, Gay, Bisexual and Transgender) people in higher education was recently summarized by Renn (2010). A key point she made was that T&GD students are included by some researchers into LGBT without acknowledging the differences between T and LGB. As suggested by the “Genderbread Person”, sexual orientation is unrelated and very different to gender identity, which can be simply described as who you are attracted to and who you are, respectively.</span></div>
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<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The issue that affect T&GD students can be overlooked and lost within the LGBT banner with the assumption that all problems these groups experience are similar and that it is enough to “queer” the academy. An example is that, in the recent “queering the academy” special issue in Higher Education Research and Development Society of Australasia (HERDSA), T&GD people were not discussed separately, ignoring much of the discussion from Renn (2010) about how important the distinction is. The major difference is that, while LGBT people primarily encounter social problems, T&GD people also find practical problems and discrimination that LGB people do not. Thus these groups should be considered separately.</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The structure of this article is as follows. I first further clarify terms and facts concerning trans and gender diverse people. I then give an autoethnographical insight into what it is like to be T&GD in academia. After this I describe in depth the obstacles that limit the inclusion of T&GD students and staff, detail the best practice for academic institutions to deconstruct these obstacles and highlight the broader benefits to all in the academic community from these changes.</span></div>
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<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Mythbusting T&GD people</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">While the publicity of trans issues might make it appear that we’re being accepted in society – and increasingly, we are – there is still an extraordinary amount of harassment directed towards T&GD persons. Transphobia (less commonly known as transprejudice) is very real, and examples of it are everywhere (e.g. Human Rights Commision, 2008). Many transphobic actions are based on lack of knowledge or misunderstanding. It is thus vital to define and clarify the terms and facts concerning T&GD people.</span></div>
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<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">It is important to understand that sex and gender are quite different. At birth, your sex is determined by a doctor looking at your body and categorising your biological reproductive ability as male, female or intersex. Somewhere between 0.1% and 1.7% of births don’t fit the typical male or female definition and are intersex. The natural variation in sexual development is an active area of research, and we’re really only beginning to understand how bodies develop differently (Ainsworth, 2015; Fausto-Sterling, 2015).</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Separate to a person’s sex is that person’s gender. This is the social construct by which we categorise people as a “man” or a “woman”. In short, sex is about your body; gender is about how you present and how you wish to be seen. It is becoming clear that gender arises from both ‘nature’ and ‘nurture’ working together (Fausto-Sterling A., 2000 & 2012). Here it becomes useful to separate out gender identity and gender expression as in the “Genderbread Person” in Figure 1. Sex, gender identity and expression are separate and take on different values independently. Within each axis there is a huge variation of level allowed and these can vary with time. For most people their sex, gender identity and expression align, with man to male or woman to female, being cisgender. The opposite alignment of sex and gender is to be transgender. </span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">For some people gender is more beyond the female/male binary. It is possible to be a mix of genders or be outside the binary genders. There are multiple other cultures (for example: Maori, Samoan, Tongan, North American, Mexican, Indian and older European cultures) where a third gender (or more) are recognised and celebrated; the idea of gender being more than just male or female has been around for millennia (Nanda, 1999). The fact that so many cultures have developed the idea of a third gender indicates that T&GD persons have been around for a very long time, even though T&GD people have at times been ignored, marginalised or victimised by the dominant culture. Today terms such agender, androgynous, gender diverse, genderqueer, gender nonconforming or non-binary have evolved. Finally for most T&GD people the gender identity is stable, if it is not some use the term genderfluid.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Figure 1</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> – The Genderbread person, retrived from </span><a href="http://itspronouncedmetrosexual.com/2015/03/the-genderbread-person-v3/" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://itspronouncedmetrosexual.com/2015/03/the-genderbread-person-v3/</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><br /></span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><br /></span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">For T&GD people, being able to live in their gender identity and to access appropriate medical treatments if desired lead to vastly improved health outcomes and quality of life (Gomez-Gil et al., 2012; Gorin-Lazard, 2012; Durwood, McLaughlin & Olson, 2017). Therefore, it is inadvisable to force those who struggle with their assigned gender on a daily basis to just “accept it”. For some T&GD people, medical transition is very important. This may include surgery to align their body with their gender identity. A more common step is for trans people to take hormones, which significantly influence various sex characteristics in bodies. However many people transition only socially, where expression and identity are aligned through performance of gender. </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">An excellent resource for those who wish to learn more about T&GD people I recommend the book “</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Trans Bodies, Trans Selves: A Resource for the Transgender Community</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">” (Erickson-Schroth, 2014). That covers every aspect concerning T&GD people.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">A personal story of being a trans academic</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><br /></span></div>
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<a href="https://lh3.googleusercontent.com/i_HCIfgns7jAS_tqs_LDxNfnuvZ0N_iuLKypQuYReI1G-4pweqvPki9L-CwhG7Xh2s2penz5dCvYri2Rr7s52SlxvTQsrIOjux8LC9QWJJJ9HumIJNEg85n3JuD0VctP3MASXz-z" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="102" src="https://lh3.googleusercontent.com/i_HCIfgns7jAS_tqs_LDxNfnuvZ0N_iuLKypQuYReI1G-4pweqvPki9L-CwhG7Xh2s2penz5dCvYri2Rr7s52SlxvTQsrIOjux8LC9QWJJJ9HumIJNEg85n3JuD0VctP3MASXz-z" style="border: none; transform: rotate(0rad);" width="200" /></a><img height="195" src="https://lh3.googleusercontent.com/BbGkbUNe4Disp-onlrRiLrLcTFcP2CKlprqZen8gMXaXAMRCAgjyAM4beCv2WdQqL7gKSfZGsG6RqM86wWSgBvQm0RAUe_jouUaNfuEAUN2E5bvVA5TkODmesUnZQIGrE41lsCMH" style="border: none; transform: rotate(0rad);" width="200" /><img height="200" src="https://lh5.googleusercontent.com/g-0A9S-J7fCG7WbdAFqyfixdJ0BukFkTCOTKSGQuDkKAvSThFW_xqaQdE-Jfld4ASW2n_xjAyvZ_ge9NIR5WaMDAGRc7Z6HO-gp0RJyvZ_-4oQkMcpyAMRlcpcfHJWZy1SOFGZiP" style="border: none; transform: rotate(0rad);" width="138" /></div>
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<span style="font-family: "arial"; font-size: 11pt; font-weight: 700; vertical-align: baseline; white-space: pre-wrap;">Figure 2</span><span style="font-family: "arial"; font-size: 11pt; vertical-align: baseline; white-space: pre-wrap;"> - The various tweets in which I’ve came out on Twitter. Chronologically ordered from left to right.</span></div>
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<span style="font-family: "arial"; font-size: 11pt; vertical-align: baseline; white-space: pre-wrap;"><br /></span></div>
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<span style="font-family: "arial"; font-size: 11pt; vertical-align: baseline; white-space: pre-wrap;"><br /></span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Stories exist concerning trans academics but they tend to be as blogposts rather than refereed articles (e.g., McKinnon, 2014; Grollman, 2016; Eldridge, 2016; Mink, 2016; Cremin, 2017). Telling our stories can be problematic because individual T&GD people cannot be expected to speak for all T&GD people. We must consider carefully how to encompass the full range of T&GD people if we’re invited to tell our story (Rands, 2009). </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">While I came out to close friends during my student days, it was some years before I came out more publically as an academic. This was prompted in part by having joined Twitter four years ago. Twenty years ago I was isolated as a student but today the internet and social media makes it possible to contact and interact with other trans people, especially other trans academics and students. This made me realize that I was not alone. Twitter also gave me a chance to come to understand myself and develop strategies about how to be myself. It also led to an interesting way to come out myself to work colleagues without having to have awkward conversations as shown by my tweets in Figure 2.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">After outing myself publicly through Twitter, it took some time before I began to present as a woman at University regularly. It is still a balance I’m working on but support from colleagues, my Head of Department and students has played a big part in my social transitioning. To date I have experienced little negativity that others in my situation have (Valentine et al., 2009). This may have something to do with the New Zealand setting with local culture including diverse genders. Or due to the huge privilege I already have as a popular and successful lecturer. This is because I came out only after having a permanent lectureship having benefitted from a large amount of cisgender male white privilege to reach this position.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">I am uncertain whether I would have achieved my past success if I had come out earlier. It is likely that the more junior an academic is the more obstacles they would face in their career progression. In general many T&GD faculty encounter problems in finding employment, receiving negative student evaluations and higher rates of discrimination and harassment than LGB faculty (Valentine et al., 2009; Dualitea, 2014; Hanna, 2016)</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">There is some debate on whether LGB teachers should out themselves or not. Generally there is known to be a danger that this will negatively affect an academic’s career (Russ, Simonds & Hunt, 2002). For T&GD academics this question is whether they should be the person they know they are or not. It is tricky as for more junior academics they put their future career at risk. Although I know from personal experience that, without carrying around a weight of secrecy, I free up more energy for research and teaching.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">I am aware that being out I have raised awareness of T&GD people within academia. To understand what impact I have had I asked on Twitter for feedback from people about what they have learnt from my Twitter feed and what they think is most important. The link to the twitter thread is (</span><a href="https://twitter.com/astro_jje/status/871903363574706176" style="text-decoration: none;"><span style="background-color: transparent; color: navy; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">https://twitter.com/astro_jje/status/871903363574706176</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">). I was surprised about the number of comments, even from people I haven’t interacted with before who were male, female and T&GD. They also pointed out aspects that I hadn’t even begun to consider, especially indicating benefits to the broader community beyond T&GD people. The following quotation sums up the general tone of comments:</span></div>
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<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">“Okay, several people have given similar responses to mine, but let me chime in. I learn a ton from your tweets because you are so honest about how being trans affects your life and your work. That helps me understand better the gender-related biases and limitations that exist in our field and in society. Like how the question of what to wear for giving a talk takes on a whole new dimension of significance for you than it does for me. Or how traveling is an extra source of stress for you bc of concerns about how you present. But beyond that, it's also really cool to get a sense for how you experience the world in a different way than I do. It's clear that your non-binary identity enriches your research and teaching, and I think that's exciting! “ </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Jennifer L. Hoffman, @astroprofhoff </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">(https://twitter.com/astroprofhoff/status/871960399024869376)</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">What I hadn’t thought about is the broader aspects of my “moving gender beyond the binary” for all genders in STEM. It is shown in this quotation:</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">“You being open in Twitter is important to me for several reasons: 1) giving exposure to trans people and the trans experience to help the community empathise with it and understand it better. Only by exposure to diversity can you reduce sexism and tackle gender roles 2) the main issue with sexism in STEM is not just aversion to women but aversion to femininity. Being very feminine I am scared I might be taken less seriously. You embrace your femininity and/or your masculinity in different ways everyday but you are still you and are still a scientist. Science is beyond gender, gender roles and gender expression. That is what you represent to me.” </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Héloïse Stevance, @sydonahi</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">(https://twitter.com/Sydonahi/status/871979693683167232)</span></div>
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<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt; text-align: justify;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">It is important to note that not only women responded. Men also follow me and learn from my stories on Twitter. One respondent highlighted the practical issues that affect T&GD people. It is making people aware that many simple things become more difficult for T&GD people, just so that we can be who we are:</span></div>
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<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">From my perspective, just being visible -- constant reminder that some awesome scientists are trans/genderfluid -- is already valuable. On top of that, as others have said, specific things you experience that others take for granted -- broadening our sense of the possible. Example in your timeline: I hadn't thought seriously about how one might wake up experiencing a different gender than they did yesterday... And how that might affect talk invites, and business trips, and interviews, dude. Realizing that could even be a thing plants a seed. Long story short, thanks so much for sharing your experiences -- if you do write things we can pay/tip you for (unlike Nature) let us know!</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Richard Scalzo, @scalzonova</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">(https://twitter.com/scalzonova/status/872062964425261056)</span></div>
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<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">While I am aware of these broader benefits, the one I care about most strongly is that I’ve been a more visible role model for other T&GD students and staff. By being me as an academic, I enable T&GD students to “see” themselves in academia and have some sense of belonging. This is key as many elements of academia make them feel unwelcome and question whether they should be studying at all. Also I hope I can break down some of the barriers that may stand in the way of T&GD students who aim to progress through the academic hierarchy. By being a successful trans faculty I will hopefully reduce any academics’ unconscious bias against T&GD people. These following three quotations from T&GD students show this quite eloquently:</span></div>
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<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">“As for why it's important: role models! Knowing that there are successful academics out there who are trans & that I can be successful too in astronomy w/o hiding my identity ?️?”</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">A Zovaro, @photonhandler</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">(https://twitter.com/photonhandler/status/872062909735518208)</span></div>
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<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">“helps me feel like i DO belong in STEM even with all the binary talk, and even beyond sci that i'm no less valid than a binary person i have even, in a particularly stinging instance of being deadnamed/misgendered, perused your tweets to help myself overcome the involuntary queasiness of it. in a phrase, makes me feel represented and less isolated which is super important i haven't thanked you properly. so thank you for existing and putting yourself out there. it means a lot to me and, i'm sure, others.”</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Lemon Beckham, @ecolemonology</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">(https://twitter.com/ecolemonology/status/872051043172995072)</span></div>
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<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">“as a trans person who is out to basically everyone at school, it's important to see that there are other people like me and also understanding how your experience differs from cis people's, whose perspective is the only one we tend to see”</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Kate Mraz, @frostykate</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">(https://twitter.com/frostykate/status/872067063052939264)</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt; text-align: center;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Being active on Twitter can be considered as part of my workload beyond teaching and research. It is one problem with there being so few T&GD faculty that we may be expected to take on a large amount of extra mentoring and service. For example T&GD students come to talk to me for support and advice. Also colleagues see me as a resource to explain best practice when working with T&GD people. </span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">This began in 2014 when I discovered the students had set up an informal support group named </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Trans on Campus. </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">After joining I used my academic privilege by amplifying their voices to help them gain normalization within the University. Such a role goes largely unaccounted for in formal time allocation processes despite the significant extra load on my time and the hidden emotional and mental load of having to think and explain these issues. It reduces the time and energy I have for teaching and research. This negates some of the gains from being out. However I know the work has been worthwhile and rewarding. It seemed upon first joining </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Trans on Campus,</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> every few weeks there was an issue to work to drive change at the University of Auckland. However the intensive work has been done and serious problems to resolve occur less frequently. Based on my experience gained in the last three years and combining it with the current literature, I am able to outline the main obstacles for T&GD students and suggest how to remove them.</span></div>
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<br /></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Obstacles, solutions and benefits for all for T&GD people in academia</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The obstacles for a T&GD person in society are constant discrimination and harassment (Human Rights Commission, 2008). While many people are accepting of T&GD people, a few are actively hostile and many may be unconsciously biased. Inside universities and tertiary education environments there is possibly less discrimination and harassment but they still exist. There are also obstacles unique to the tertiary environment (Valentine, Wood & Plummer, 2009; Powell, 2016). Typically they concern changing personal details on institutional records or being asked not to use toilets or changing facilities. The severity of problems depend on a T&GD person’s stage of transition. A person who transitions before University will meet fewer issues. More significant problems are encountered by T&GD people who find that the university environment is the first time they can begin to explore their gender identity away from strong parental influence.</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">While studies have been undertaken around the world on the experiences of LGB and T&GD people in academia (e.g. Valentine et al., 2009) the local culture of a country can change the nature of the experiences of minority groups (e.g. Suen, 2015). It is interesting then to explore how the experience of T&GD students in NZ is different to those from the UK interviewed by Valentine et al., (2008).</span></div>
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<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The first detailed NZ study was performed by Powell (2016) who undertook a pioneering investigation into the experience of T&GD students in tertiary education in New Zealand</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. The work revealed that discrimination was not, except for one out of seven students interviewed, overt or intended but pervasive in minor events that led to repeated microaggressions. Examples include, every time a class list is handed around or a roll is called the student might be outed or challenged with the “oh but that was a male name”. Perhaps the worst case is when the student needs to visit the toilet. Most people don’t have to stand in front of two doors and decide whether they should go in one and run the risk of being verbally abused or the other where they might get physically abused. Even if they opt for the all gender accessible toilets they might be challenged with a “why are you going in there?”. This leads to the students experiencing a state of hypervigilance, always being on guard and having to plan out their day, for example how to avoid certain groups of people or to use a bathroom at a quiet time of day. It is a significant extra mental load in comparison to cisgender students. </span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">In addition to the challenges from interacting with other members of academia, there is also discrimination at an institutional level. Administrative processes and course curriculums typically assume only binary gender. This can range from only discussion of only men and women in gender studies courses, or courses that include ‘gender’ in the title, e.g. history, literature or art history courses. But this can extend to gender options on forms and surveys for administrative purposes or gender segregation of student groups, societies and sports teams. Or in the planning and design of new buildings, including only male or female toilets and changing rooms when including all gender facilities would be easiest at this point. In the wider world T&GD encounter many of the same problems but many businesses are becoming more inclusive and Universities are in some ways being left behind (e.g. Weiss, 2007).</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">In the past, students and staff members had to develop their own personal strategies to overcome these issues. The most important is getting in contact with one another and sharing their knowledge and strategies about how to cope or get around these issues. Also my experience, having discussed this with colleagues and T&GD students themselves, endorses Powell (2016), who found how significant personal interactions were to the comfort or discomfort of T&GD students. A well-educated, understanding and proactive person can make an enormous impact on making T&GD students feel welcome. Making them feel welcome in a class is as easy as remembering their name and taking care with pronouns without requiring them to explain themselves (see Spade, 2011 for a list of simple steps). If universities and tertiary education establishments undertake some simple steps to normalize inclusion of T&GD students, they can achieve what a few individuals already have across their institution and improve the experience and achievements of these student.</span></div>
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<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Powell (2016) made recommendations of how universities can achieve this (here we have changed inclusion to normalisation as discussed in a recent presentation</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">):</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: decimal; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Tertiary education providers should recognise the impact of binary gender norms on T&GD people. </span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: decimal; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Providers should begin education programmes for staff that support the active creation of environments that normalise T&GD people.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: decimal; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Providers should investigate policies, processes and curricula where T&GD people require inclusion. </span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: decimal; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Establishment of research scholarships to support increased research within the community and to create events where findings relating to T&GD studies can be shared. </span></div>
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<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Upon considering these recommendations and using my own experience from dealing with T&GD people in academia, there are three broad themes to tackle these issues: identity, environment and culture. </span></div>
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<br /></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Identity</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The major issue in identity concerns how a person interacts with the administration of an institution. For example, can a person identify as a gender other than male or female within the University computer systems or when filling out applications and surveys? Can they change it by specifying a gender not currently considered? Recently NZ Statistics have undertaken a significant review to determine how best to include options beyond the gender binary. Other studies have been performed to determine best practice to include transgender people in such surveys (Statistics NZ, 2014; Staples et al., 2017). </span></div>
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<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">How easy is it for a student to change their name? Can they get their degree certificates reprinted with a new name due a gender change? These questions each highlight very simple change that can be made. Their simplicity can make them seem unimportant but they are vital in acknowledging that a student has the right to say who they are and for an institution to recognize them. They also ensure a student’s safety as all these simple steps remove the accidental outing of a student which may place them at risk.</span></div>
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<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Specific examples at the University of Auckland include a grant that was set up for T&GD students to be able to change their name legally to avoid problems with being outed by use of the legal name that does not match their gender. Unitec has also created a similar grant for T&GD students to aid their transition. These are positive and simple action. For people who transition after graduating the University of Auckland will reprint their degree certificates without charge. Students can also now change their unique ID used to access the University IT system. </span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">This achievement is one example where a gain for T&GD students has broader consequences. In working and debating with University IT services on how and why people can change their unique IDs, the process is clarified for all. Thus others at the University also clearly know if, when and how this identifier can be changed. For example if the ID contains offensive words or needs to be changed for the safety of an individual. Clarifying how to change the unique ID and the processes of when this can be done makes it easier for all.</span></div>
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<br /></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Environment</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Environment concerns the buildings and physical infrastructure of an institution. For T&GD people these cover four physical needs: toilets, changing rooms, a safe space where LGBT students can meet and work in peace and access to healthcare. These issues in essence boil down to ensuring T&GD student safety. All the evidence points towards the fact that discrimination and harassment commonly occur in toilets against T&GD persons (Powell 2016, Spade, 2011; Valentine et al. 2009). This makes the simple act of using the toilet a major event that requires planning or a good deal of travelling to find a safe toilet. This places unnecessary strain on T&GD persons. I myself have stopped using a gendered toilets when I can and felt reluctance using gendered toilet when there is no other option.</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">A tertiary institution should tackle this problem from two directions. First to change culture so it is clear that everyone can use the toilet or changing room that matches their gender identity without harassment. Second to endeavour to create all gender toilets and changing rooms available on many locations on campus so students do not have to go on a long journey to find one. There is some debate as to whether it is the best practice to use accessible toilets for this. In fact the best solution is for all toilets to be for all genders. This also have benefits for others in the University environment, for example for students with carers or who are carers of someone with a different gender to themselves. Improving toilet access has been difficult at the University of Auckland although there are now more all gender toilets near to large lecture theatres. Auckland University of Technology has led the way here with 165 toilets now assigned as all gender</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">.</span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">One physical resource that is more difficult to supply is a safe space for T&GD students to study. Setting up on campus’ a “Queer Space” for all LGBTI students can have a positive impact on the academic achievement of students, providing a place for them to be themselves and study in peace. At the University of Auckland a Queer Space was setup in 2013 (Joule, 2015). </span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The final issue around environmental concerns is the access to medical care and counselling at University health services. T&GD people rely on these services for support of their transition as well as general health care. Some health services can be fantastic while others refuse care of T&GD people (Human Rights Commission, 2008; Giffort & Underman, 2016). This is true in the society and within academia. Steps can be taken within universities to make sure that services are compliant with policy on inclusion. This solution is to raise awareness of T&GD people to all staff members, not just doctors, on how to interact with T&GD students. This links into our next topic of changing the culture of the institution.</span></div>
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<br /></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Culture </span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The culture concerns the attitude of the institution and specifically the people within it. This is the most difficult to change as it involves getting everyone, staff and students, to treat T&GD people with respect despite their backgrounds, beliefs and points of view. This can be achieved by getting everyone working together as shown by Case et al. (2012), where staff and students worked together to include transgender students in University Nondiscrimination statements. </span></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Changing the culture involves making people aware of the above issues in identity and environment for T&GD people. For example, with the class roll try to make sure that a list of names isn’t passed around or called out. Try not to create situations that might out people. Try not to use sexist or misogynistic binary gender examples, or treat T&GD persons as examples where they are portrayed as something that could be ridiculed. Schools are already taking steps to educate students and the benefits of such education appear clear (Burford et al., 2013; InsideOUT, 2016).</span></div>
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<br /></div>
<div dir="ltr" style="line-height: 1.3800000000000001; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Don’t wait for students to ask for options beyond the gender binary. If something is setup for a gender binary someone should always say, “but gender isn’t binary, what’s the best thing to do?”. One good example is sometimes teams have gender quotas, rather than saying “must have so many male or female”, perhaps say no group can be dominated by “more than 60% of one gender”. The advantage here is that it works in both a male, female or diverse gender dominated group. </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">While a general education in diversity is useful, a specific introduction to T&GD issues is important. A way to achieve this is to use the fact that universities are there to educate. A key step is to change the way gender is taught within courses, modifying the teaching and curriculum to teach gender as a more complex issue. This is difficult but much research has been done into how to achieve this (Rands, 2009; Malatino, 2015). The primary role of universities is to teach. If they teach gender as we understand it today that understanding will ripple out into society. It must also extend into research processes and methods. For example the University of Auckland ethics panel has now started to request this to be included for any such surveys they are asked to endorse. This is a simple way to bring awareness of T&GD people into the minds of many within the University.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Other steps that have been taken at the University of Auckland is to set up a LGBTI staff & student network to begin some activism for positive change within the University. In addition the </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Trans on Campus</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> group was setup, initially by students, for T&GD people at the University. This has been a positive group that has achieved significant changes to the University policies and procedures. The group also created education documents that are included on the University website as well as gave some training sessions</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. AUT has recently set up a similar group for their own students</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. Our most recent work concerns the inclusion of T&GD people in university sports teams, this involves working with other Universities. The current inclusion policy in place for inter-University sport (UTSNZ, 2017) is problematic and does presents obstacles to inclusion of T&GD students in sport.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The benefits of this work for the broader academic community are many. Raising the discussion of equity and inclusion within an institution can only be positive, especially if people just start to think about the experiences of others. Also challenging all aspects of the gender binary of male and female in expression, identity and roles can lead to greater thought and consideration of gender equity. For example as pointed out by comments to my Twitter question, my own exploration of my masculinity and femininity encourage other people to express themselves as they want to. There is sometimes in STEM subjects a pervasive atmosphere that women should perform like men to succeed. By to some degree exploring and expressing my own femininity I normalize in some way that you can be feminine and be successful in a STEM subject and more broadly in academia.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">There are many other aspects to equity and inclusion that are outstanding in academia beyond gender such as race, ethnicity, disability and socioeconomic status and these issues can all intersect (e.g. Traxler et al., 2016; Prescod-Weinstein, 2017). These aspects also intersect strongly. Raising awareness that academia is unequal, even for one group, is important because by bringing these issues out into the open and driving education and discussion the result can only be positive. When asking questions about gender and seeing the problems with the binary system, it leads to a broader understanding and acceptance for all.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Looking forward</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">In this article we have argued that tertiary education institutions need to change to normalise T&GD people, including how they deal with the identity of members of academia, how the environment is shaped and culture of the institution. The required changes at the core involve seeing gender as more complex than the antiquated pervasive binary. It is also important to note that changes will also have a broader benefit to all members of academia, not just those requiring them to ensure their safety and ability to succeed in academia.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Acknowledgements</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">I thank my supervisors Susan Carter and Alistair Kwan for continuous support, advice and encouragement to take my work as far as possible. Fellow </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Trans on Campus</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> members for continuing support and education. Trudie McNaughton and Terry O’Neill for help dealing with T&GD issues at the University of Auckland. Elizabeth Stanway, Nicholas Rattenbury and Dr Wife for constructive comments and proofreading. </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Case K.A., Kanenberg H., Erich S.A., Tittsworth, J., 2012,</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Transgender Inclusion in University Nondiscrimination Statements: Challenging Gender-Conforming Privilege through Student Activism.</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">, Journal of Social Issues, Vol. 68, No 1., pp 145-161</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Clark T. C., Lucassen M. F. G., Bullen P., Denny S. J., Fleming T. M., Robinson E. M., Rossen F. V., 2014, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The health and well-being of transgender high school students: Results from the New Zealand Adolescent Health Survey (Youth’12)</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. Journal of Adolescent Health, 55, 93-99. </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Cremin C., 2017,</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Man-Made Woman: The Dialectics of Cross-Dressing, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Pluto Press. ISBN-13: 978-0745337128</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Dualitea., 2014,</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Transitioning in Academia</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">, Tenure She Wrote, </span><a href="https://tenureshewrote.wordpress.com/2014/09/18/transitioning-in-academia/#more-1512" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">https://tenureshewrote.wordpress.com/2014/09/18/transitioning-in-academia/#more-1512</span></a></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Durwood L., McLaughlin K.A., Olson K.R., 2016, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Mental Health and Self-Worth in Socially Transitioned Transgender Youth, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Volume 56, Issue 2, Pages 116–123, DOI: </span><a href="http://dx.doi.org/10.1016/j.jaac.2016.10.016" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://dx.doi.org/10.1016/j.jaac.2016.10.016</span></a></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Eldridge, J.J., 2016</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">, Guest Post: Understanding Gender Fluidity</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">, Women in Astrononmy, </span><a href="http://womeninastronomy.blogspot.co.nz/2016/10/genderfluidity.html" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://womeninastronomy.blogspot.co.nz/2016/10/genderfluidity.html</span></a></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Erickson-Schroth L., 2014, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Trans Bodies, Trans selves: A Resource for the Transgender Community.</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Oxford University Press. ISBN: 978-0-19-932535-1</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Fausto-Sterling A., 2000, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Sexing the Body: Gender Politics and the Construction of Sexuality</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. Basic Books. ISBN: 9780465077144</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Fausto-Sterling A., 2012, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Sex/Gender: Biology in a Social World</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">, The Routledge Series Integrating Science and Culture. ISBN-13: 978-0415881463</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Fausto-Sterling A., 2015, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Intersex: Concept of multiple sexes is not new</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. Nature, Vol. 519, p. 291</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Giffort D.M., Underman K., 2016, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The relationship between medical education and trans health disparities: a call to research.</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Sociology Compass. Vol. 10, p.999-1013 DOI: 10.1111/soc4.12432</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Gomez-Gil E., Zubiaurre-Elorza L., Esteva I., Guillamon A., Godas T., Cruz Almaraz., Salamero M., 2012</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">, Hormone-treated transsexuals report less social distress, anxiety, and depression. </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Psychoneuroendocrinology, 37, 662-670. Doi: 10.1016/j.psyneuen.2011.08.010.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Gorin-Lazard A., 2012,</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Is hormonal therapy associated with better quality of life in transsexuals? A cross-sectional study.</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Journal of Sexual Medicine, 9(2), 531-541. DOI: 10.1111/j.1743-6109.2011.02564.x</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Grollman, E.A., 2016, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">On being trans and non-binary at UR: one (sort of closeted) professor’s perspective</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. The Collegian. Retrived from: </span><a href="http://www.thecollegianur.com/article/2016/02/on-being-trans-and-non-binary-at-ur-one-sort-of-closeted-professors-perspective" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://www.thecollegianur.com/article/2016/02/on-being-trans-and-non-binary-at-ur-one-sort-of-closeted-professors-perspective</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Haas A.P., Rodgers P.L., Herman J.L., 2014, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Suicide Attempts among Transgender and Gender Non-Conforming Adults</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. American Foundation for Suicide Prevention. Retrived from: </span><a href="http://williamsinstitute.law.ucla.edu/wp-content/uploads/AFSP-Williams-Suicide-Report-Final.pdf" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://williamsinstitute.law.ucla.edu/wp-content/uploads/AFSP-Williams-Suicide-Report-Final.pdf</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Hanna, A., 2016, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Being Transgender on the Job Market.</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Inside Higher Education</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><br class="kix-line-break" /></span><a href="https://www.insidehighered.com/advice/2016/07/15/challenge-being-transgender-academic-job-market-essay" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">https://www.insidehighered.com/advice/2016/07/15/challenge-being-transgender-academic-job-market-essay</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Human Rights Commision, 2008, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">To Be Who I Am: Report of the Inquiry into Discrimination Experiences by Transgender People</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">, ISBN: 978-0-478-28639-7</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">InsideOUT, 2016, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Making Schools Safer For Trans and Gender Diverse Youth</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. Retreived from: </span><a href="http://insideout.org.nz/wp-content/uploads/2016/03/Making-Schools-Safer-For-Trans-and-Gender-Diverse-Youth-web.pdf" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://insideout.org.nz/wp-content/uploads/2016/03/Making-Schools-Safer-For-Trans-and-Gender-Diverse-Youth-web.pdf</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Joule L., 2015, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Getting things done: a collaborative approach to supporting the lesbian, gay, bisexual, transgender and intersex (LGBTI) staff and student community at the University of Auckland,</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Higher Education Research & Development, 34:4, 808-810, DOI: 10.1080/07294360.2015.1034347</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Malatino H., 2015,</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Pedagogies of Becoming Trans Inclusivity and the Crafting of Being. </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">TSQ: Transgender Studies Quarterly, Volume 2, Number 3, 395 DOI 10.1215/23289252-2926387</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">McKinnon R., 2014, Some Thoughts on Being a Trans Professor, p166, Trans Bodies, Trans Selves: A Resource for the Transgender Community. ISBN: 978-0-19-932535-1</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Miller L.R., Grollman E.A., 2015, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The Social Costs of Gender Nonconformity for Transgender Adults: Implications for Discrimination and Health.</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Socialogical Forum. Vol. 30, p. 809-831 DOI: 10.1111/socf.12193</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Mink, J., 2016, Losing Privilege and Gaining Something Else, Women in Astronomy,</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><br class="kix-line-break" /></span><a href="http://womeninastronomy.blogspot.co.nz/2016/11/losing-privilege-and-gaining-something.html" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://womeninastronomy.blogspot.co.nz/2016/11/losing-privilege-and-gaining-something.html</span></a></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Nanda S., 1999, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Gender diversity: Crosscultural variations. </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Long Grove, IL: Waveland Press. ISBN 13: 978-1-4786-1126-4</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Powell C., 2016, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">A place to stand: Creating inclusive environments for diverse gender tertiary students</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. Master’s Thesis, Unitec Institute of Technology.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Prescod-Weinstein C., 2017, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Curiosity and the end of discrimination</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. Nature Astronomy, 1, 145, doi:10.1038/s41550-017-0145 Retrieved from: </span><a href="https://t.co/1YAaCUtrmu" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">https://t.co/1YAaCUtrmu</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Rands K.E., 2009, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Considering Transgender People in Education A Gender-Complex Approach, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Journal of Teacher Education Volume 60 Number 4 p.419-431 DOI: 10.1177/0022487109341475</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Renn K.A.,2010, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">LGBT and Queer Research in Higher Education The State and Status of the Field </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">2010 Educational Researcher Volume: 39 issue: 2, page(s): 132-141 DOI: DOI: 10.3102/0013189X10362579</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Russ T.L., Simonds C.J., Hunt S.K., 2002, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Coming out in the classroom…an occupational hazard? The influence of sexual orientation on teacher credibility and perceived student learning.</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Communication Education, 51(3), 311–324. </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Spade D., 2011, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Some Very Basic Tips for Making Higher Education More Accessible to Trans Students and Rethinking How We Talk about Gendered Bodies.</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Radical Teacher, Number 92, Page 57</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Staples J.M., Bird E.R., Masters T.N., George W.H., 2017, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Considerations for Culturally Sensitive Research With Transgender Adults: A Qualitative Analysis,</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> The Journal of Sex Research, DOI: 10.1080/00224499.2017.1292419</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Statistics New Zealand, 2014, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Gender identity: Developing a statistical standard.</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> (Fleur Mulligan) Available from </span><a href="http://www.stats.govt.nz/" style="text-decoration: none;"><span style="background-color: transparent; color: navy; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">www.stats.govt.nz</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Suen Y.T., 2015, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Methodological reflections on researching lesbian,gay, bisexual and transgender university students in Hong Kong: to what extent are they vulnerable interview subjects?,</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Higher Education Research & Development, 34:4, 722-734, DOI: 10.1080/07294360.2015.1051009</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Traxler A.L., Cid X.C., Blue J., Barthelemy R., 2016, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Enriching gender in physics education research: A binary past and a complex future.</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Phys. Rev. Phys. Educ. Res. 12, 020114 </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">University & Tertiary Sport New Zealand (UTSNZ), 2017, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Transgender Policy,</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span><a href="https://www.utsnz.co.nz/files/UTSNZ_Transgender_Policy_.pdf" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">https://www.utsnz.co.nz/files/UTSNZ_Transgender_Policy_.pdf</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Valentine G., Wood N., Plummer P., 2009, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The experience of lesbian, gay, bisexual and trans staff and students in higher education.</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> Research report, Equality Challenge Unit</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Weiss J.T., 2007, </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Transgender workpace diversity: Policy tools, training issues, and communication strategies for HR and legal professionals.</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 11pt; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> North Charleston, SC: BookSurge</span></div>
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JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com0tag:blogger.com,1999:blog-7229687138516899224.post-18777141468392424242016-12-29T13:27:00.002-08:002016-12-29T13:42:53.056-08:00JJ's 2016 in review.<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">So that was a busy year. I’m not sure what critical reflection on all of this I can give beyond this was probably at the limit of what I can achieve/do within a year. I spent way too much time working and not enough with family and friends. But at least with the <a href="http://nzstars2016.nz/" target="_blank">#NZstars2016</a><span id="goog_1338073280"></span><span id="goog_1338073281"></span><a href="https://www.blogger.com/"></a> conference out of the way and only the proceedings to sort out my time should become a little less constrained and I can try to get some balance back into my life. </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><br /></span></div>
<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Anyway if you're wondering why I've been so stressed this year, here is a probably incomplete list of everything I've done:</span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Research:</span></div>
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<span style="font-family: "arial";"><span style="font-size: 14.6667px; white-space: pre-wrap;">10 papers, 2 by PhD students, 2 as first author.</span></span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: circle; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">BPASS merging black holes (1st author) </span><a href="http://adsabs.harvard.edu/abs/2016MNRAS.462.3302E" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://adsabs.harvard.edu/abs/2016MNRAS.462.3302E</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: circle; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">iPTF13bvn disappearance of progenitor star. (1st author) </span><a href="http://adsabs.harvard.edu/abs/2016MNRAS.461L.117E" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://adsabs.harvard.edu/abs/2016MNRAS.461L.117E</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: circle; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Contribution of binary stars to reionization (2nd author) </span><a href="http://adsabs.harvard.edu/abs/2016MNRAS.456..485S" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://adsabs.harvard.edu/abs/2016MNRAS.456..485S</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: circle; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">New neutron-star kick model in pop synth. (2nd author) </span><a href="http://adsabs.harvard.edu/abs/2016MNRAS.461.3747B" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://adsabs.harvard.edu/abs/2016MNRAS.461.3747B</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: circle; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Inflation and clumping in Wolf-Rayet stars. (2nd author) </span><a href="http://adsabs.harvard.edu/abs/2016MNRAS.459.1505M" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://adsabs.harvard.edu/abs/2016MNRAS.459.1505M</span></a></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: circle; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Highly-stripped electron-capture SN progenitors. (2nd author) </span><a href="http://adsabs.harvard.edu/abs/2016MNRAS.461.2155M" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://adsabs.harvard.edu/abs/2016MNRAS.461.2155M</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: circle; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Comparing 7 widely used spectral synthesis models (minor role)</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><br class="kix-line-break" /></span><a href="http://adsabs.harvard.edu/abs/2016MNRAS.457.4296W" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://adsabs.harvard.edu/abs/2016MNRAS.457.4296W</span></a></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: circle; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">X-ray progenitor constraints for ccSNe (minor role) </span><a href="http://adsabs.harvard.edu/abs/2016MNRAS.457.1107H" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://adsabs.harvard.edu/abs/2016MNRAS.457.1107H</span></a></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: circle; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Light-curves of 38 stripped-envelope ccSNe (minor role)</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><br class="kix-line-break" /></span><a href="http://adsabs.harvard.edu/abs/2016MNRAS.457..328L" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://adsabs.harvard.edu/abs/2016MNRAS.457..328L</span></a></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: circle; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Binary Wolf-Rayet stars in the SMC (minor role)</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><br class="kix-line-break" /></span><a href="http://adsabs.harvard.edu/abs/2016A%26A...591A..22S" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://adsabs.harvard.edu/abs/2016A%26A...591A..22S</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><br class="kix-line-break" /></span></a></div>
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<span style="font-size: 14.6667px; vertical-align: baseline; white-space: pre-wrap;">Talking at astronomy meetings: ANITA Summer School, ANITA Workshop talk, SAGB/SNe meeting talk, ASA Annual Meeting talk, Connection between SLSNe and LGRBs meeting at the Space Telescope Science Institute in Baltimore - Invited Colloquium at STScI summarizing the meeting </span><a href="https://webcast.stsci.edu/webcast/detail.xhtml?talkid=4876&parent=1" style="text-decoration: none;"><span style="color: #1155cc; font-size: 14.6667px; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">https://webcast.stsci.edu/webcast/detail.xhtml?talkid=4876&parent=1</span></a><span style="font-size: 14.6667px; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<span style="font-size: 14.6667px; vertical-align: baseline; white-space: pre-wrap;">Invited talk at the Centre for Astrophysics at Harvard.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">In December finally got around to drafting BPASSv2 instrument paper eventhough results have been online at bpass.auckland.ac.nz since 2015!</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">BPASS used in multiple papers without input or knowledge from me. People are using the wonderful tool! And finding it useful!</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Wrote second Nature News & Views article: </span><a href="http://adsabs.harvard.edu/abs/2016Natur.534..478E" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://adsabs.harvard.edu/abs/2016Natur.534..478E</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Service (astronomy):</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Organized an IAU Symposium, <a href="http://nzstars2016.nz/" target="_blank">#NZstars2016</a> which was complete success on every level! 177 astronomers in NZ to discuss the science find most interesting. Also equity was at the top of our minds when organizing it so will be writing a guide for how to make an inclusive and equitable meeting soon.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">In collaboration with Nick Rattenbury advised on the science to Gilda Kirkpartick for <a href="http://astarons.com/" target="_blank">Astarons</a> Volume 2 which also featured on Real Housewives of Auckland.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Took part in discussions to set up Astro Aotearoa of research astronomers in NZ group.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">For with the<a href="http://asa.astronomy.org.au/" target="_blank"> Astronomical Society of Australia</a> to boost links to NZ.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Joined the ASA Inclusive Diverse Equitable Astronomy (<a href="https://asa-idea.org/" target="_blank">IDEA</a>) committee.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Applied for Pleiades award for Auckland Physics Department in collaboration with the department’s equity working group..</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Multiple public outreach talks in Te Awamatu, Hamilton and AAS again.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Curated @astrotweeps for a week.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Started writing this blog for science, sci-fi and more stuff!</span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Service (University, Academia and wider):</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Continuing work for trans rights at University and in Academia (</span><a href="http://astrojje.blogspot.co.nz/2016/05/mythbusting-trans-gender-diverse-people.html" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://astrojje.blogspot.co.nz/2016/05/mythbusting-trans-gender-diverse-people.html</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">). </span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Invited talks to speak about gender diversity (Diversity in Astronomy meeting talk, Monash University Colloquium - </span><a href="https://www.youtube.com/watch?v=SAMiWRi7_Yo" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">https://www.youtube.com/watch?v=SAMiWRi7_Yo</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">).</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Wrote a Women in astronomy blogpost (</span><a href="http://womeninastronomy.blogspot.co.nz/2016/10/genderfluidity.html" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">http://womeninastronomy.blogspot.co.nz/2016/10/genderfluidity.html</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">).</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Also working for University LGBTI network and Rainbow Science but still work to do, this is one area that I didn’t have enough time to put enough effort in.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Talked at inaugural annual post-doc society symposium about my career pathway.</span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Teaching (as one of people with highest teaching load that is still research active!):.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Taught 5 courses: 2x 1st year astro, 2nd year astro, 2nd year electromagnetism and 3rd year astro+particles! This all pushed me to the limit and I don’t think my teaching was as good as it could have been. Especially when 4 of these courses were in the same semester. But somehow scraped through for students thinking that my teaching was okay. This was also in addition to being openly gender diverse too. </span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">At same time taking a course in Academic Practice, scoring A- grade. Also replanned and rewrote a design for 2nd year courses. Hopefully setting the format for future success of students in physics and to build on the 1st year redesign.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Still supervising my 3 PhD students, two of which published papers this year. Two are on course to submit next year and all their science is so super exciting!</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Continued running the successful seminar series for physics department PhD students. Where previously there was no formal time all the PhD students would be together. This has led to the students having a great feeling of being a cohort of students.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Won the departmental teaching award for all of the above, especially the 2nd year course redesign.</span></div>
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<br />JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com0tag:blogger.com,1999:blog-7229687138516899224.post-33147270494731703682016-09-03T21:14:00.006-07:002016-09-03T21:20:34.269-07:00Science of sci-fi: Does every planet look like home?<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="font-family: "arial"; font-size: 14.6667px; line-height: 1.38; white-space: pre-wrap;">It is a fact that today we know a surprising amount out extrasolar planets. The first exoplanets were detected in 1988 and as of August 2016, we know of 3374 exoplanets in 1257 planetary systems with 121 around binary stars. But before we get onto what we know about real planetary systems, what does sci-fi say planets should be like.</span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">In sci-fi’s early days budgets were low and it was cheapest to have a planet of the week episode. While it was possible to make a set or choose a location, like a quarry that looked alien, all the worlds looked very much like Earth and buildings look very much like Earthican architecture. Although some locations could be picked with modern/strange architecture to give the impression of the future and/or alien worlds. Originally shows like Star Trek would have painted backdrops of locations to get around this issue. Of course today with modern computer graphics everything is possible.</span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">An example of this can be seen in Star Trek episodes like “</span><a href="https://en.wikipedia.org/wiki/The_Paradise_Syndrome" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">The Paradise Syndrome</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">” where the planet really looks very lifelike, especially with the pine trees! Even modern Dr Who still has Earth like planets as in “</span><a href="https://en.wikipedia.org/wiki/New_Earth" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">New Earth</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">”, although they do say in the episode this is because humanity were looking for an exact replica of Earth. </span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">There are exceptions to this though for example in the Star Trek episode “</span><a href="https://en.wikipedia.org/wiki/Whom_Gods_Destroy_(Star_Trek:_The_Original_Series)" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">Whom Gods Destroy</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">” the planet the prison is on has a poisonous atmosphere which humanoids cannot survive in and spacesuits are needed to survive outside. Then in the Dr Who episode “</span><a href="https://en.wikipedia.org/wiki/The_Impossible_Planet" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">The Impossible Planet</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">” the episode is set on a planet orbiting a black hole. While in Star Wars there is the planet </span><a href="https://en.wikipedia.org/wiki/Tatooine" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">Tatooine</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> which is a planet around a binary star system.</span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">In all these cases we know planets like this, Venus in our own solar system is extremely deadly to life. While the first extrasolar planets discovered were discovered around another type of remnant of a dead star, a neutron star: </span><a href="https://en.wikipedia.org/wiki/Pulsar_planet" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">pulsar planets</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. While we are now discovering many planets around binary stars.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><br /></span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">It is worth noting in passing that some TV series do try to explain away the reason why all life and planets look so human. For example in Star Trek the planets were all seeded with the same DNA by an extinct race that were alone in the Galaxy (see "<a href="https://en.wikipedia.org/wiki/The_Chase_(Star_Trek:_The_Next_Generation)" target="_blank">The Chase</a>"). While in Stargate we are all descended from the Ancients with the <a href="https://en.wikipedia.org/wiki/Goa%27uld" target="_blank">Goa'uld</a> having taking slaves from the Earth around the Universe.</span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">When we look at our </span><a href="https://en.wikipedia.org/wiki/Solar_System" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">solar system</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> we see that we only have 8 planets, 4 terrestrial or Earth-like planets and 4 gas-giants. Other than Earth the 3 other terrestrial planets: Mercury, Venus and Mars are all inhospitable. Mercury is a tiny ball or mainly iron with no atmosphere that is close to the Sun. Venus has a thick dense carbon dioxide atmosphere that would bake and crush you due to the temperature and the pressure while Mars is not too cold but has only a rare atmosphere without any oxygen. Only the Earth is habitable with water liquid on its surface. Habitable zones around stars are called </span><a href="https://en.wikipedia.org/wiki/Circumstellar_habitable_zone" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">“Goldilocks” zones</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> although considering Venus and Mars are in or close to the zone we can see that being in the zone does not ensure humans could survive easily on such a planet.</span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Although it is possible to live on Mars as anyone who has seen/read “The Martian” knows (or Dan Dare or any of the other multiple books/movies/programs based on Mars). Furthermore we realise that Mars could be terraformed, that is using technology we could engineer the planet so that it becomes more Earth like. Infact such a scheme is the main plot of a computer game </span><a href="https://en.wikipedia.org/wiki/UFO:_Afterlight" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">UFO: Afterlight</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> and a few different book series. I show below screenshots from the game of how Mars would look “before” and “after”. </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><img height="249" src="https://lh3.googleusercontent.com/vUhX1BBE42QCy_jXteJZ7rJ6EqpPOOeuC7BBGPQZ2gmSLNy0UABaUsoYLWVzTyAYMAwYyMmMFVngYH_YIDordLqHiYkdFwXKMvc5iHr_gZOIMjz4LWS9dlUBdSHrc8KwpgZeyKOu" style="border: none; transform: rotate(0rad);" width="400" /></span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><img height="250" src="https://lh5.googleusercontent.com/9MVeaowJaEbNfkUSgemuzdYsDQdGHygVHNw14kpiI5yaBANycYv8kSr0sVredpbVbHeClUE7I-WYPref_z8ETSmgqc_YMsf_aUMLpa7F1mc38cIRkvN4CTT4yryvR9fHyJ7cNRJv" style="border: none; transform: rotate(0rad);" width="400" /></span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Terraforming also features in the TV series </span><a href="https://en.wikipedia.org/wiki/Firefly_(TV_series)" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">Firefly</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. The backstory to the series being that our solar system was dying so humanity moved to another system with a large number of planets that had to be terraformed. Interestingly only some of the planets are fully terraformed with some of the planets more arid and dry, suitable for the western style stories the show is focused on. [Warning: be warned if you watch Firefly you will never get over the fact there is only one series and a movie. You will spend the rest of your life waiting for the revival or animated episodes that may never be made…]</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">When we look at other solar systems most of the planets we find are more like the gas giants in our system, Jupiter, Saturn, Uranus and Neptune. However they orbit much closer to the host star so are typically called “hot-Jupiters”. The problem with gas giants is they’re all just gas! There is no solid surface so they are uninhabitable. </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">One final trope that has happened repeatedly in science fiction is the idea that gas giants have moons, just as our solar system has, and if the gas giants are closer in to their star those moons might become habitable. Star Wars has both the moon “</span><a href="https://en.wikipedia.org/wiki/Yavin" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">Yavin IV</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">” and the “</span><a href="https://en.wikipedia.org/wiki/Endor_(Star_Wars)" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">forest moon of Endor</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">” although the gas giant is never seen in Return of the Jedi, but it is in the “</span><a href="https://en.wikipedia.org/wiki/Star_Wars:_Ewoks" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">Ewoks</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">” cartoon series. Also many people normally forget but in Avatar, </span><a href="https://en.wikipedia.org/wiki/Fictional_universe_of_Avatar" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">Pandora</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> is orbit around a gas giant called Polyphemus (a very blue looking jupiter clone!). With many other moons visible setting way for the sequels. </span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">We know that moon of gas giants in our solar system are very large and would be considered to be terrestrial planets if they were in orbit around the Sun or another star. There looking for these exomoons are also a possible place where humanity could visit in the future. They’re difficult to find but we will find them eventually and with so many gas giants known in the habitable zone maybe these moons are the greatest place we might find other life forms in the Universe.</span></div>
<br />JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com1tag:blogger.com,1999:blog-7229687138516899224.post-80761897987234118542016-08-23T21:23:00.002-07:002016-08-23T21:27:08.090-07:00So how do you make a merging black-hole binary? <div dir="ltr" id="docs-internal-guid-fa13e6e9-babf-44e8-89fc-9b197663e4fd" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">So this blog post is something different: it's about my own research. The main thing I do is make computer models of stars in binaries and then compare them to stars, galaxies and other fun things and events in the Universe. I also make as many models and predictions as possible public so other astronomers can use my models in their own studies.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">Over the past year I have created my latest set of models which, while not perfect,are still a big improvement on my first go. I was in the process of writing this all up for what I call ”the instrument paper” when I started finding lots of exciting results that I thought I should publish as quickly as possible... which has led to some pretty cool papers by myself and others.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">Out of these, the coolest started with the rumour that the LIGO gravitational wave detectors had found something. Gravitational waves come from many sources, but one of the most common is from the merger of binary star systems… of exactly the kind my models can simulate. For a long time I ignored the rumours, but papers by other people in the same field started to appear which suggested the rumours might be worth investigating further.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">It wasn't until someone posted a comment on Facebook, quoting an email from someone in the US stating that LIGO had detected the merger of two black-holes, each of around 30 times the mass of the Sun, merging into a single black-hole that I got interested. While a lot of scientists were excited as gravitational waves had been detected for the first time I was excited because black holes are created in stars and we had a new way to determine what the masses of the black holes that are born in stars could be.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">It seemed that a lot of researchers thought that these black holes were unusually massive. That is true, and they are more massive than most black holes we have seen in the past, but they’re not too much more massive. Anyway, I like observational data and I like nothing better than comparing it to what my binary models predict. So I started to write a code and made some predictions in the two weeks before the announcement. The cool thing was that we already made the black hole binaries in existing models; we only needed to write a new code to calculate how long it took for the two black holes to merge and this would allow us to see which of our models could produce the observed merger within the age of the Universe.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">This work was done in close collaboration with Elizabeth Stanway from the University of Warwick. As she was in the UK and I was in Australia at the time we could take turns working on an interpretation paper with one of us sleeping while the other was hard at work! At the time it was kind of a shot in the dark - the rumours might have been untrue, and we’d have had to write off our hard work as a useful but ultimately futile exercise. Then the announcement was made and we confirmed the masses of the black holes and submitted our paper.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">As always we had to go through the peer-review process and we were asked to considerably expand our predictions to include neutron star-neutron star systems as well describe in more detail our code, which had been discussed elsewhere and it will all be in the instrument paper but it was best to also include a description of all the important stuff in this paper. So after a considerable amount of extra work and clarifications to our much improved paper it was finally accepted.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">During this time others published very similar papers but with different views and some interesting extensions. Our paper was always about showing that our BPASS code could predict roughly the right rate of black hole mergers and could reproduce GW150914, as well as all the other observations it can predict, where some other similar codes only consider single stars so can’t produce GW150914 type events.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">However one really cool and exciting new bit of science we put in was in response to trying to explain why our computer models predicted more massive black holes than some other codes. This is actually a key uncertainty of stellar evolution, how massive is the final remnant formed by the death of a star? The merger of black holes gives us a way to measure this, but it only tells us about the black holes in binary stars. What about single black holes that might been ejected from a binary by a ‘kick’ they received in their natal supernova?</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">At the same time as GW150914 was being announced, another really quite awesome study (Wyrzykowski et al., 2016) has used gravitational microlensing to find candidate single black holes drifting through our own Galaxy. This technique is widely used to discover planets around other stars, but they also found many possible black holes. What was interesting about the study is they found a number of low mass black holes near the minimum mass that can be created in stars of 3 times the mass of the Sun. Others had suggested these didn’t exist so this was a surprise.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">In our models we have a range of possible black hole masses from 3 times the mass of the Sun up to and beyond the masses of GW150914. A really fun thing though is that these single black-holes that were discovered are on average lower masses than those we see in binaries in our Galaxy and those we saw from GW150914 and the other recent similar detections.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">The figure below shows the results of the black hole masses. Predictions from our code for single stars are shown in red, black holes in binaries in blue with the solid line representing the mean black hole masses with the dashed lines represent the boundaries within which about 68% of black hole masses must be within. The vertical axis is the black hole masses while the horizontal axis is the “metallicity” of the stellar models - a measure of which generation of stars they are: less metals is an earlier star. The grey shaded region represents the metallicity range of our Galaxy. The black horizontal lines are the masses of the black holes in GW150914. The asterisks are known black holes in binaries while the red and blue points are the masses of the single star and binary star observations. </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;"><img height="318" src="https://lh5.googleusercontent.com/dtWFae4bCMjPLUQ6zbq1f5Y67cegHQRUHr42cc-VFz5067u-JmbhfZG5lTPl6CNp0M6vR-gSC-FDEqTLyI86NyCMBG1gdI8-1GKcjkQ527KwJc80qoymRCk17nHJmvIXfBMZjkgr" style="border: medium none; transform: rotate(0rad);" width="400" /></span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">What this plot tells us is that more massive black holes are more likely to be seen in binaries and lower mass single star black holes are more likely to be unbound in their forming supernova and so seen in isolation. This is quite an interesting finding: more gravitational wave sources and more single black hole detections by gravitational microlensing will tell us a surprising amount about black hole formation.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">My favourite plot those is the next one, it is a quite colourful and dramatic plot. Each panel shows the predictions for a different generation of stars in the Universe and the brightest colours indicate where the most common black hole mergers should occur. They range from some of the earliest stars in the Universe (in the upper left panel) to those similar to the ones forming in our own Galaxy (in the lower right). On top of this are the 3 detected black-hole mergers to date of GW150914 (dark blue, top right) LVT151012 (green, middle) and GW151226 (cyan, lower right). Each system is plotted twice as we don’t know which black hole came from which star: the initially more or less massive.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">The contours and shading then represent where the masses of the most likely black hole mergers. We can see that GW150914 is only possible at the lower metallicities, while the others are possible in all populations and GW151226 is closer to the typical mass of black hole mergers expected in all the populations.</span></div>
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" 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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">The one interesting thing is GW151014 is a typical merger at the lowest metallicities which means it might have come from some of the earliest stars to form in the Universe. Although we can’t be certain. To show this we need to do a similar study to some of our fellow astronomers, Belczynski et al., who also modelled in how many stars of different generations were formed at different times through the Universe and how long they would take to merge and so whether they would be observed today. They found either the binary merger was relatively recent or again closer to the formation of the Universe. While this requires lots of assumptions about unknowns in cosmic history, we may try to calculate this with our own models in future.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">The key result we wanted to show, and why we wrote the paper, was just that in BPASS our models naturally have these black-hole mergers in. The code does both population and spectral synthesis and it is one of very few spectral synthesis codes that can predict black-hole mergers alongside all our predictions of stellar clusters and galaxy populations. Why? Well the other most common ones assume all stars are single! Only a binary code like ours can get close to the correct black-hole merger rate inferred from LIGO after its first observing run.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;">We’re starting to find that including binaries makes a key difference to our understanding of the Universe - all the way from distant galaxies to individual stars. Combining the LIGO and lensing results with our BPASS code has added another piece to the jigsaw.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;"><b>References</b> </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;"><a href="http://adsabs.harvard.edu/abs/2016Natur.534..512B" target="_blank">Belczynski et al., 2016, Nature </a></span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;"><a href="http://adsabs.harvard.edu/abs/2016arXiv160203790E" target="_blank">Eldridge & Stanway, 2016, MNRAS</a></span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline;"><a href="http://adsabs.harvard.edu/abs/2016MNRAS.458.3012W" target="_blank">Wyrzykowski et al., 2016, MNRAS</a></span></div>
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JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com0tag:blogger.com,1999:blog-7229687138516899224.post-74407664601908201632016-07-22T13:47:00.000-07:002016-07-23T13:28:58.237-07:00Science of sci-fi spaceflight<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">So this is a (short? well it was meant to be but...) blogpost about some details of the science of sci-fi. I’ll be discussing some general aspects along the “science of spaceflight”. My next posts will be on “does every planet look like home?” and “gender diversity in sci-fi” but these ones I thought best to put online first. It is really meant to be some companion text to my lectures that I’ve given for the course in science fiction at the University of Auckland as well as for my Physics 107/G course. This is because my lecture notes are just PDFs of my slides as it’s always useful to have some text for students to read and revise from. These are also a starting point for more formal “notes” on this subject that I’m putting together with my collaborator on this project, Elizabeth Stanway.</span></div>
<b id="docs-internal-guid-bd74c57b-145a-4487-fcaf-fc343b0784e8" style="font-weight: normal;"><br /></b>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">So below we’re going to use sci-fi movies, television, radio and books to point out good, bad and ugly science in these media. Trying to get the mindset to do this is difficult, some people want to take everything apart and say that it’s all impossible. Here we take a more positive view. Sometimes this is easy, sometimes this is difficult as normally things are done to drive a story without actually checking to see if they’d work or are even realistic.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">Science of sci-fi spaceflight</span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The first key thing in a lot of science fiction stories is that faster-than-light travel is possible. Unfortunately in our current understanding of science this is impossible, nothing can travel faster than the speed of light and this is set by the theories of special and general relativity. However it is necessary to open up new worlds for people to be able to visit so stories can events can occur.</span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">There are many “standard” ways of breaking the Universe’s speed limit and some are less/more likely than others:</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Time and Relative Dimensions in Space (or TARDIS)</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> for short. This is the mechanism used by the Time Lords in Dr Who to travel around the Universe and through time. In reality it depends on a modified version of general relative to move through spacetime between locations and times. The TARDIS itself has also had some dimensional manipulation with it being bigger on the inside than the outside with all this happening due to higher dimensions existing to make everything work. This is a good example of something that sounds plausible but we have no idea how it works.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Star Gates, Jump Gates and Worm holes:</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> these are also common in sci fi but most widely used/popularized in stargate. It opened up travel around our Galaxy without the need to have big expensive spaceships. Although programs like Babylon 5, Buck Rodgers and the movie Interstellar had the stargate/wormholes in space. The difference between the two is that the “gates” are traditionally artificial and can go to many places in the Universe while the Wormholes are normally naturally occurring. However the physics is the same and “could work”. In General Relativity there are solutions called Einstein-Rosen bridges which connect two otherwise unconnected points in spacetime by a shortcut through higher dimensions. The problem is we have no idea how to build these things! But we know how they’d work. As a quick aside most of the time the holes appear to be 2D surfaces however it's in Interstellar they point out it should be a 3D spherical zone for the wormhole.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Warp Drives:</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> these are the primary engine in Star Trek. It works by shrinking the space in front of a spacecraft and expanding the space behind (i.e. warping it!) then as the spaceship travels at apparently sublight speeds it’s appears to be actually travelling faster than light to an outside observer. Again feasible in relativity but we don’t know how to warp space time in the necessary way….</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 700; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Hyperspace: </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">is similar to the TARDIS but rather than allowing a person to move in time is allows someone to move in space. The real question is, if you can do one why can’t you do another? Although it might be that space dimensions are easier to shortcut around than the time dimensions.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Quantum tunnelling/teleportation:</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> ah the good old transporter from Star Trek. Yes all possible but very difficult. We have transported information and single atoms but doing that with an entire person is very difficult. And also you do have a probability to be anywhere in the Universe instantly right now, but it’s very very, very, unlikely. The one extra worthy mention is the show “Quantum Leap” where the main character not only teleported from place to place but also from time to time.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: disc; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Or it could be </span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">really weird</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">, I mean we’re talking about things which break a number of well held physical principles so anything could happen to enable us to travel faster than light and it would look really weird and incomprehensible to us, like the infinite improbability drive in Hitchhikers Guide to the Galaxy! [</span><a href="https://www.youtube.com/watch?v=nCf53ses22w" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">CLIP HERE</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">]</span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Now while faster than light is one issue, another *HUGE* problem with sci-fi is they have a habit of getting the sublight craft breaking most laws of physics we know. For example, they typically break most of Newton’s laws of motion.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Newton’s three laws were discovered earlier by others but he first wrote them down as:</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: decimal; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">With no force acting on it a body remains at rest or moves in a straight line with constant speed.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: decimal; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">A force acting on a mass causes an acceleration that is related to the force and mass of the object.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: decimal; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Every force has an equal and opposite force acting on another body.</span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">So to explain these a bit more:</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: decimal; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">This never happens on the Earth as we’re always experiencing the force of gravity so accelerating downwards. Or if we’re moving we experience air resistance that slows us down. In deep space though we should be able to observe this and do!</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: decimal; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">For the same push it’s very easy to push a small car for instance compared to trying to push a fully loaded lorry. The more massive object needs a bigger force (or more people) to get the same acceleration.</span></div>
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<li dir="ltr" style="background-color: transparent; color: black; font-family: Arial; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; list-style-type: decimal; text-decoration: none; vertical-align: baseline;"><div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Just think, you’re sitting on a chair that is pushing back up with a force equal and opposite to your weight that is pushing down on the chair. If these weren’t equal you’d sink through the chair or be thrown up to the ceiling.</span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">When we look at science fiction movies, typically those with space battles all these laws are pretty much ignored with airplane in atmosphere flight physics models. Many computer games do this too as the sense and feeling would feel wrong to views, or at least people thought it would do. This has all changed now. Looking at movies like </span><a href="https://en.wikipedia.org/wiki/WALL-E" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">WALL-E</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> and shows like </span><a href="https://en.wikipedia.org/wiki/Battlestar_Galactica_(2004_TV_series)" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">Battlestar Galactica</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> both of these have excellent physics outside in space. </span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">The classic example is in the way that in both of these it is apparent even when engines are switched off that fighters are still in motion and can flip over to fire at a ship behind. When in an atmospheric dogfight, e.g. as in Top Gun, a pilot needs to pull dramatic maneuvers to lose someone behind them and get behind them. A BSG example battle can be seen </span><a href="https://www.youtube.com/watch?v=ZkJ4gDHI0VI" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">here</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">. Towards the end you can see how Apollo can maneuver the fighter in a low gravity vacuum. </span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">For a less violent example when WALL-E is lost outside the spacecraft and propelling himself around with a fire extinguisher all the laws can be seen to be in action. For example, how tough it is for him to rendezvous with EVA. See a clip </span><a href="https://www.youtube.com/watch?v=NPW3mvAN0Rc" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">here</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Star Wars is a good example where all the fighters move as if they were in an atmosphere. Although this is a throwback to the 1977 movie when the decision was taken to make sure people believed the space ships so the atmospheric flight physics was used. As can be seen </span><a href="https://www.youtube.com/watch?v=2WBG2rJZGW8" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">here</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> the Rebel fighters are taken out by Tie Fighters behind them but in Battlestar Galactica they’d just have to flip over and shoot behind them.</span></div>
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<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">One notable mention is that Dr Who can sometimes get it right. There is a classic example in </span><a href="https://en.wikipedia.org/wiki/Four_to_Doomsday" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">Four to Doomsday</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> when the 5th Doctor is stuck outside a spaceship. He gets back to the TARDIS by bouncing a cricket ball of the spaceship to get a double momentum boost from the ball. Once when he throws it and again a second when he catches the ball once he bumps off the spaceship.</span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">These physics also allow us to decide what is a “good” spaceship design or not. For example do they have a way of having gravity in their spaceship other than a magical gravity motor as in Star Trek and Star Wars. </span></div>
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<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Ships like those in </span><a href="https://en.wikipedia.org/wiki/Defying_Gravity_(TV_series)" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">Defying Gravity</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">, </span><a href="https://en.wikipedia.org/wiki/Space_Odyssey_(TV_series)" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">Space Odyssey: Voyage to the Planets</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">, </span><a href="https://en.wikipedia.org/wiki/2001:_A_Space_Odyssey_(film)" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">2001</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">, </span><a href="https://en.wikipedia.org/wiki/2010_(film)" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">2010</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> and </span><a href="https://en.wikipedia.org/wiki/Avatar_(2009_film)" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">Avatar</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> do have centrifuges on the spaceships that spin to give artificial gravity. Interestingly all these ships are designed for moving around in the solar system alone, apart from Avatar which is an interstellar spacecraft. Therefore most of the craft are similar except in Avatar where the craft has much larger engines as well as a mirror on the front of the craft that acts as a solar sail to help accelerate/decelerate the craft.</span></div>
<br />
<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">If you’re interested in what a real interstellar spacecraft might look like we suggest you look up the “</span><a href="https://en.wikipedia.org/wiki/Project_Daedalus" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">Daedelus</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">” and the “</span><a href="https://en.wikipedia.org/wiki/Project_Icarus_%28interstellar%29" style="text-decoration: none;"><span style="background-color: transparent; color: #1155cc; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: underline; vertical-align: baseline; white-space: pre-wrap;">Icarus</span></a><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">” projects on wikipedia.</span><br />
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><br /></span>
<b><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.6667px; font-style: normal; font-variant: normal; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Added note</span><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.6667px; font-style: normal; font-variant: normal; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">:</span></b><span style="background-color: transparent; color: black; font-family: "arial"; font-size: 14.666666666666666px; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> whenever I give this talk (and after posting this) it's always pointed out by someone that <a href="https://en.wikipedia.org/wiki/Babylon_5" target="_blank">Babylon 5</a> also had realistic flight and space battles. Now I've only seen bits of it but those who have think it was great and ahead of its time so there is another one to add to the "to-watch" list!</span></div>
JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com0tag:blogger.com,1999:blog-7229687138516899224.post-21477699960760347042016-05-08T16:02:00.001-07:002016-05-08T16:02:37.113-07:00Mythbusting trans & gender diverse people: by the students and staff of "Trans on Campus".<div class="normal" style="text-align: justify;">
<span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;">Today, trans and gender diverse people are very much in the public eye, but we have always been here! It</span><span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;">’</span><span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;">s
only now, with high profile celebrities coming out, that we have become
newsworthy. Even here in New Zealand, almost every month there is an
article about trans or gender diverse people published in the NZ Herald,
or in online media such as stuff.co.nz.</span></div>
<div class="normal" style="text-decoration: none;">
<br /></div>
<div class="normal" style="text-align: justify;">
<span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;">While the publicity of trans issues might make it appear that we</span><span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;">’</span><span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;">re
being accepted in society </span><span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;">–</span><span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;"> and increasingly, we are
</span><span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;">–</span><span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;"> there is still an extraordinary amount of harassment and violence directed
towards T&GD persons. Transphobia (less commonly known as transprejudice) is very real, and examples of it are everywhere.</span></div>
<div class="normal" style="text-decoration: none;">
<br /></div>
<div class="normal" style="text-align: justify;">
<span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;">Given
this, we want to break down a few myths about sex, gender and about
T&GD persons. Many assume that gender is determined
solely by our biology, or is entirely socially constructed. The truth
of our current scientific understanding is that it is determined by both
and that sex and gender are not necessarily linked. Anyway let</span><span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;">’</span><span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;">s
get on with the mythbusting!</span></div>
<div class="normal" style="text-decoration: none;">
<br /></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">1.</span> <span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">There are only two sexes, male and female.</span><span class="normal__Char" style="color: black; font-size: 12pt;"><br />
</span><span class="normal__Char" style="color: black; font-size: 12pt;">At
birth, your legal sex is determined by a doctor looking at your body
and categorising your reproductive ability as male, female or intersex.
Yes, that</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">s
right: somewhere between 0.1% and 1.7% of births don</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">t
fit into those nice normal boxes of male and female. And
while some intersex variations are obvious from birth, others may not
be apparent until later in life. This natural variation in sexual
development is an active area of research, and we</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">re
really only beginning to understand how our bodies develop. Research published in Nature last year (Ainsworth C., 2015,
</span><span class="normal__Char" style="color: black; font-size: 12pt; font-style: italic;">Nature</span><span class="normal__Char" style="color: black; font-size: 12pt;">, Vol. 518, pp. 288</span><span class="normal__Char" style="color: black; font-size: 12pt;">–</span><span class="normal__Char" style="color: black; font-size: 12pt;">291;
Fausto-Sterling A., 2015, </span><span class="normal__Char" style="color: black; font-size: 12pt; font-style: italic;">Nature</span><span class="normal__Char" style="color: black; font-size: 12pt;">,
Vol. 519, p. 291) shows that gender expression can even vary
within one body. So, while the rates of intersex persons has been
traditionally thought to be low, the true rate could be closer to 1%.
(Fausto-Sterling A., 2000,
</span><span class="normal__Char" style="color: black; font-size: 12pt; font-style: italic;">Sexing the Body: Gender Politics and the Construction of Sexuality</span><span class="normal__Char" style="color: black; font-size: 12pt;">).</span></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<br /></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">2.</span> <span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">But gender and sex are the same thing!</span><span class="normal__Char" style="color: black; font-size: 12pt;"><br />
</span><span class="normal__Char" style="color: black; font-size: 12pt;">Gender is the construct by which we categorise people as a
</span><span class="normal__Char" style="color: black; font-size: 12pt;">“</span><span class="normal__Char" style="color: black; font-size: 12pt;">man</span><span class="normal__Char" style="color: black; font-size: 12pt;">”</span><span class="normal__Char" style="color: black; font-size: 12pt;">
or a </span><span class="normal__Char" style="color: black; font-size: 12pt;">“</span><span class="normal__Char" style="color: black; font-size: 12pt;">woman</span><span class="normal__Char" style="color: black; font-size: 12pt;">”</span><span class="normal__Char" style="color: black; font-size: 12pt;">
and in many cultures around the world possibly as other genders. For
most people, their sex and gender align, referred to as being cisgender,
but for between 1.2% to 3.7% of people they don</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">t
and they identify as transgender or gender diverse. These numbers come from the Youth</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">12 survey, 1.2% of interviewees
said they were transgender, while another 2.5% said they were questioning their gender. (Clark et al., 2014,
</span><span class="normal__Char" style="color: black; font-size: 12pt; font-style: italic;">Journal of Adolescent Health</span><span class="normal__Char" style="color: black; font-size: 12pt;">, Vol. 55, p. 93). In short, sex is about your body; gender is about
how you present and how you wish to be seen.</span></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<br /></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">3.</span> <span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">If gender is a social construct, then being trans is a choice.</span><span class="normal__Char" style="color: black; font-size: 12pt;"><br />
</span><span class="normal__Char" style="color: black; font-size: 12pt;">While
most people seem happy with their birth-assigned gender that is linked
to their sex (including many intersex people), some people have a strong
desire that their gender and sex are
not the same. For these people, it is well-known that being able to
live in their chosen gender role and to access appropriate medical
treatments as desired, leads to vastly improved health outcomes and
quality of life. Therefore even if our gender identities
are socially constructed, it seems unreasonable to force those who
struggle with their assigned gender on a daily basis to just
</span><span class="normal__Char" style="color: black; font-size: 12pt;">“</span><span class="normal__Char" style="color: black; font-size: 12pt;">accept it</span><span class="normal__Char" style="color: black; font-size: 12pt;">”</span><span class="normal__Char" style="color: black; font-size: 12pt;">.
There is also growing evidence that neuroanatomy can play a
considerable part in determining gender identity, which is determined by
our DNA as well as hormone levels in the womb affecting how certain
parts of our brain develop. As such, it</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">s
clear that gender is a case of both </span><span class="normal__Char" style="color: black; font-size: 12pt;">‘</span><span class="normal__Char" style="color: black; font-size: 12pt;">nature</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">
and </span><span class="normal__Char" style="color: black; font-size: 12pt;">‘</span><span class="normal__Char" style="color: black; font-size: 12pt;">nurture</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">
working together. (Fausto-Sterling A., 2012, </span><span class="normal__Char" style="color: black; font-size: 12pt; font-style: italic;">Sex/Gender: Biology in a Social World</span><span class="normal__Char" style="color: black; font-size: 12pt;">, The Routledge
Series Integrating Science and Culture).</span></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">4.</span> <span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">Non-binary genders are a new thing.</span><span class="normal__Char" style="color: black; font-size: 12pt;"> </span></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;"><br />
</span><span class="normal__Char" style="color: black; font-size: 12pt;">Actually,
it is our modern Western binary gender view of male and female that is
new! There are multiple other cultures (for example: Maori, Samoa,
Tongan, North America</span><span class="normal__Char" style="color: #333333; color: black; font-size: 12pt;">n</span><span class="normal__Char" style="color: black; font-size: 12pt;">,
Mexican, Indian and older European cultures) where a third gender (or
more) are recognised and celebrated; the idea of gender being more than
just male or female has been around for millenia. The fact that so many
cultures have developed the idea of a third
gender indicates that T&GD persons have been around for a very long
time, even though we have at times been ignored or marginalised by the
dominant culture.</span></div>
<div class="normal" style="text-align: justify; text-indent: 36pt;">
<span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;">(</span><a href="https://mail.auckland.ac.nz/owa/redir.aspx?SURL=_A4Bgq61KZq4aHkTBOQ6D0q647T0UDq30L0CftZjazdOzcmelHfTCGgAdAB0AHAAcwA6AC8ALwBlAG4ALgB3AGkAawBpAHAAZQBkAGkAYQAuAG8AcgBnAC8AdwBpAGsAaQAvAFQAcgBhAG4AcwBnAGUAbgBkAGUAcgAjAFAAbwBwAHUAbABhAHQAaQBvAG4AXwBmAGkAZwB1AHIAZQBzAA..&URL=https%3a%2f%2fen.wikipedia.org%2fwiki%2fTransgender%23Population_figures" target="_blank"><span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: underline;">https://en.wikipedia.org/wiki/Transgender#Population_figures</span></a><span class="normal__Char" style="color: black; font-size: 12pt;">).</span></div>
<div class="normal" style="text-align: justify; text-indent: 36pt;">
<br /></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">5.</span> <span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">There aren</span><span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">’</span><span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">t
that many T&GD people, so why should we worry?</span><span class="normal__Char" style="color: black; font-size: 12pt;"><br />
</span><span class="normal__Char" style="color: black; font-size: 12pt;">We have 40,000 students at UoA. Assuming the rate of 1.2</span><span class="normal__Char" style="color: black; font-size: 12pt;">–</span><span class="normal__Char" style="color: black; font-size: 12pt;">3.7%
cited above, this means that somewhere between 480 and 1500 current
students at UoA are either trans or gender diverse. Get all of them in a
lecture theatre and tell them they are unimportant! Another to
visualise it is about 1</span><span class="normal__Char" style="color: black; font-size: 12pt;">–</span><span class="normal__Char" style="color: black; font-size: 12pt;">2%
of people worldwide have naturally red hair, but we don</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">t claim that red hair doesn</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">t
exist, or forces people with red hair to dye their hair a different colour to </span>
<span class="normal__Char" style="color: black; font-size: 12pt;">‘</span><span class="normal__Char" style="color: black; font-size: 12pt;">fit in</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">! </span></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<br /></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">6.</span> <span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">But I don</span><span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">’</span><span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">t
know any T&GD people!</span><span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;"><br />
</span><span class="normal__Char" style="color: black; font-size: 12pt;">Do you know more than 50 to 100 people? Given the statistics, there</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">s
a good chance you do! The might also not be </span><span class="normal__Char" style="color: black; font-size: 12pt;">‘</span><span class="normal__Char" style="color: black; font-size: 12pt;">out</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">
and may be too scared to tell you or anyone else. Or maybe, you know
someone that has already have transitioned, and is living as their true
gender, so they have had no need to disclose their personal medical
history.</span></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<br /></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">7.</span> <span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">Why do some people change gender with time, or decide to come out later in
life?</span><span class="normal__Char" style="color: black; font-size: 12pt;"><br />
</span><span class="normal__Char" style="color: black; font-size: 12pt;">As
we grow up and go through life, though, our bodies change, our friends
change, our interests change, our priorities change and our confidence
and understand change. It is therefore not
at all surprising that our gender can also change over time. It can
also be that it takes time before someone is able to due to
circumstances and ability to take steps to transition or experiment with
their gender expression.</span></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<br /></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">8.</span> <span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">So you just need to have surgery and then be happy?</span><span class="normal__Char" style="color: black; font-size: 12pt;"><br />
</span><span class="normal__Char" style="color: black; font-size: 12pt;">For
some T&GD people, surgery to align their sex with their gender is
indeed very important. A more common step is for trans people to take
hormones, which are one of the primary factors
in various sex characteristics developing in our bodies. But just as
you would not ask any other person for intimate details of their medical
history, please don</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">t
ask T&GD people about theirs! As with any other person, we will
talk about our personal health and the specifics of our bodies if we
feel comfortable doing so; if you</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">re
interested there are plenty of resources which are freely available to learn more.</span></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<br /></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">9.</span> <span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">Which toilets do you use?</span><span class="normal__Char" style="color: black; font-size: 12pt;"><br />
</span><span class="normal__Char" style="color: black; font-size: 12pt;">For those of us who feel comfortable, whichever option is closest to the gender we</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">re
presenting as. This often makes a lot of us feel unsafe, though, so
some of us might use unisex/genderless toilets. An increase in
unisex/genderless toilets would actually be a good thing for everyone,
making it easier for parents out alone with their young
children to help out without the barriers of gender segregation, and
for personal support workers and disabled people out in public. Not all
disabled people want or can consistently have a personal support worker
of the same sex, but many of the accessible
stalls on-campus are within gender-segregated washrooms. Really though,
should what toilet we use really matter?</span></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<br /></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">10.</span> <span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">But this all means you can</span><span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">’</span><span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">t
have a normal life with families, right?</span><span class="normal__Char" style="color: black; font-size: 12pt;"><br />
</span><span class="normal__Char" style="color: black; font-size: 12pt;">Why not? Remember, not all cisgender heterosexual couples are able to have children, yet no-one is suggesting that they can</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">t
have otherwise normal lives. We can get married, we can adopt, we can
have surrogate children, and who knows what will be possible in the
future with medical technology? Womb transplants have already been
performed, even leading to later successful pregnancies
(Br</span><span class="normal__Char" style="color: black; font-size: 12pt;">ä</span><span class="normal__Char" style="color: black; font-size: 12pt;">nnstr</span><span class="normal__Char" style="color: black; font-size: 12pt;">ö</span><span class="normal__Char" style="color: black; font-size: 12pt;">m
et al., 2014, </span><span class="normal__Char" style="color: black; font-size: 12pt; font-style: italic;">The Lancet</span><span class="normal__Char" style="color: black; font-size: 12pt;">, Vol. 385, pp. 607</span><span class="normal__Char" style="color: black; font-size: 12pt;">–</span><span class="normal__Char" style="color: black; font-size: 12pt;">616),
and scientists have managed to create fertile sperm and eggs from stem cells in animal studies (Hayashi et al., 2012,
</span><span class="normal__Char" style="color: black; font-size: 12pt; font-style: italic;">Science</span><span class="normal__Char" style="color: black; font-size: 12pt;">, Vol. 338, pp. 971</span><span class="normal__Char" style="color: black; font-size: 12pt;">–</span><span class="normal__Char" style="color: black; font-size: 12pt;">975).</span></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<br /></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">11.</span> <span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">You</span><span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">’</span><span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">re
all so brave!</span><span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;"><br />
</span><span class="normal__Char" style="color: black; font-size: 12pt;">If
we are brave, it is only because we have to be. Really, we just want to
be ourselves. T&GD persons are 4 to 5 times more likely to commit
or attempt suicide due to the harassment, bullying
and transphobia we confront everyday, even from those who are closest
to. Many are estranged from our families, or have lost their jobs,
friends, or partners because of their transition; you can imagine that
life is even harder when complete strangers are
nasty to us too.</span></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<br /></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">12.</span> <span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">This all sounds so complex! What do you want me to do?</span><span class="normal__Char" style="color: black; font-size: 12pt;"><br />
</span><span class="normal__Char" style="color: black; font-size: 12pt;">Um, not much really; just be nice! We</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">re
really just normal people at the end of the day, so try and treat us as such; don</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">t harass or bully us, even if
we</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">re different. Please use the name and pronouns we ask you to, even if you don</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">t
think they</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">re right. Using a different pronoun doesn</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">t
hurt you, but it can make a huge difference to us. Don</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">t ask us inappropriate questions you wouldn</span><span class="normal__Char" style="color: black; font-size: 12pt;">’</span><span class="normal__Char" style="color: black; font-size: 12pt;">t
ask anyone else the same! And finally, please, do let us use the bathroom in peace. I mean really, we all just need to pee!</span></div>
<div class="normal" style="text-decoration: none;">
<br /></div>
<div class="normal" style="text-align: justify;">
<span class="normal__Char" style="color: black; font-size: 12pt; font-weight: bold; text-decoration: none;">Further reading:</span></div>
<div class="normal" style="text-align: justify;">
<span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;">In addition to the references included above, we recommend the following readings:</span></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">1.</span> <a href="https://mail.auckland.ac.nz/owa/redir.aspx?SURL=W6cGZmxYva1J215-H4wTlJRTujJghTU-n1DnLkMZtf6tL8yelHfTCGgAdAB0AHAAOgAvAC8AdwB3AHcALgBhAHUAYwBrAGwAYQBuAGQALgBhAGMALgBuAHoALwBsAGcAYgB0AGkA&URL=http%3a%2f%2fwww.auckland.ac.nz%2flgbti" target="_blank"><span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: underline;">http://www.auckland.ac.nz/lgbti</span></a></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">2.</span> <a href="https://mail.auckland.ac.nz/owa/redir.aspx?SURL=MY8byaZp2JVcoC9Ifycex6mDh-T2dp3suKHQSD-xDZ6tL8yelHfTCGgAdAB0AHAAcwA6AC8ALwBlAG4ALgB3AGkAawBpAHAAZQBkAGkAYQAuAG8AcgBnAC8AdwBpAGsAaQAvAFQAcgBhAG4AcwBnAGUAbgBkAGUAcgA.&URL=https%3a%2f%2fen.wikipedia.org%2fwiki%2fTransgender" target="_blank"><span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: underline;">https://en.wikipedia.org/wiki/Transgender</span></a></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">3.</span> <a href="https://mail.auckland.ac.nz/owa/redir.aspx?SURL=yUW78JUZ8aA62f6VDqy2v-cdw3Iin_0m6oY5_xaUn8itL8yelHfTCGgAdAB0AHAAcwA6AC8ALwBlAG4ALgB3AGkAawBpAHAAZQBkAGkAYQAuAG8AcgBnAC8AdwBpAGsAaQAvAEkAbgB0AGUAcgBzAGUAeAA.&URL=https%3a%2f%2fen.wikipedia.org%2fwiki%2fIntersex" target="_blank"><span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: underline;">https://en.wikipedia.org/wiki/Intersex</span></a></div>
<div class="normal" style="margin-left: 36pt; text-align: justify; text-indent: -18pt;">
<span class="normal__Char" style="color: black; font-size: 12pt;">4.</span> <span class="normal__Char" style="color: black; font-size: 12pt; text-decoration: none;">“Trans Bodies, Trans Selves: A Resource for the Transgender Community” edited by Laura Erickson-Schroth,
Oxford University Press.</span></div>
JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com2tag:blogger.com,1999:blog-7229687138516899224.post-33006226007478598812016-02-25T01:53:00.000-08:002016-02-25T12:46:57.610-08:00Why we don't know why stars become red (super)giants<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="color: black; font-family: "arial"; font-size: small; vertical-align: baseline; white-space: pre-wrap;">A while ago I started saying in talks at conferences “that we don’t know why stars become red giants”. I’ve had to stop saying this as people start asking questions and are disbelieving about that statement. </span><span style="font-family: "arial"; font-size: small; line-height: 1.38; white-space: pre-wrap;">What I really mean is that we know red giants exist in nature and we know stars evolve into red giants in our stellar evolution code but we have no simple explanation of why this happens.</span><br />
<span style="font-family: "arial"; font-size: small; line-height: 1.38; white-space: pre-wrap;"><br /></span></div>
<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="font-family: "arial"; font-size: small; line-height: 1.38; white-space: pre-wrap;">First it's worth describing what is a red giant star (<a href="https://en.wikipedia.org/wiki/Red_giant" target="_blank">wikipedia article here</a>). Red giants are post-main sequence stars, they have completed their hydrogen to helium fusion and have formed an almost pure helium core in the centre of the star. When this happens burning no longer happens at the centre of the star but in a shell around the core. The surrounding envelope expands greatly in radius, cools and increases in luminosity with the star becoming much brighter. Our own Sun is likely to become a red giant 100 times its current radius. However some red supergiants can be 1000s of times the Sun's radius.</span><br />
<span style="font-family: "arial"; font-size: small; line-height: 1.38; white-space: pre-wrap;"><br /></span></div>
<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="font-family: "arial"; font-size: small; line-height: 1.38; white-space: pre-wrap;">So here is the key question, "why does a star with a helium core become a very large giant star?" When I mention this to other astrophysicists it is common that someone starts talking about </span><span style="font-family: "arial"; font-size: small; line-height: 1.38; white-space: pre-wrap;">“the mirror effect”. This is something that is in many textbooks but I have yet to find a derivation of the effect. It suggests that when there is a burning shell in a star whatever happens on one side of the shell, the reverse happens on the other side. Because the red giant helium core has no source of nuclear fusion it actually collapses and heats up, until the temperature is high enough for helium burning. But therefore the mirror effect implies that the envelope will expand and cool.</span><br />
<span style="font-family: "arial"; font-size: small; line-height: 1.38; white-space: pre-wrap;"><br /></span></div>
<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: small; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">There are problems with this view, one it appears to be phenomenological. Just explaining what is seen without a rigorous definition. The key question we should ask about the mirror effect is: “what is being conserved?" It can't be energy and mass, it really can't be size or volume. So we are back to not understanding in a simple physical understanding why stars become red giants. </span><br />
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: small; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><br /></span></div>
<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: small; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">At some point in their own personal evolution every stellar theorist turns to this question. I include some useful references for interested reader below, however they are quite technical papers. The method most commonly used to understand why stars become red giants is to make models in a stellar evolution code and to artificially take out or change the physics until the star doesn’t become a red giant.</span><br />
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: small; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><br /></span></div>
<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="background-color: transparent; color: black; font-family: "arial"; font-size: small; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">One interesting method has been to include “pseudo helium” in codes, something that looks like helium for a nuclear burning perspective but has the mean molecular weight and chemistry of hydrogen. This appears to show that one of the drivers to red giant-ness is the mean molecular weight in the core of a star.</span><br />
<span style="color: black; font-family: "arial"; font-size: small; vertical-align: baseline; white-space: pre-wrap;"><br /></span>
<span style="color: black; font-family: "arial"; font-size: small; vertical-align: baseline; white-space: pre-wrap;">T</span><span style="font-family: "arial"; font-size: small; line-height: 1.38; white-space: pre-wrap;">he mean molecular weight is the average mass per particle. Nuclear fusion increases this as a star turns hydrogen into heavier elements. At the beginning hydrogen has a mass of 1 proton and 2 particles, a proton and an electron if ionized. However helium has the mass of 2 protons and 2 neutrons but over 3 particles, one helium nucleus and 2 electrons. Therefore the average mass of each particle is higher after nuclear fusion. If you take out this increase in mean molecular weight it doesn't stop a stellar model becoming a red giant but it does make it more difficult.</span></div>
<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="font-family: "arial"; font-size: small; line-height: 1.38; white-space: pre-wrap;"><br /></span>
<span style="font-family: "arial"; font-size: small; line-height: 1.38; white-space: pre-wrap;">So in summary we know stars become red giants in nature and in our models but we can't give you a simple explanation and it isn't the mirror effect. It's probably something to do with the fact that stellar material becomes denser as nuclear material is processed from hydrogen to helium.</span></div>
<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="font-size: small;"><br /></span></div>
<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="font-family: "arial"; font-size: small; line-height: 1.38; white-space: pre-wrap;">One final point to note is that one factor people sometimes use to check their models of stars to is the ratio of red supergiants to blue supergiant, i.e. cool to hot post-main sequence stars. It has always been thought to be sensitive to why stars become red giants but this is in a single star view of stellar evolution. We know today that 70% of stars have their evolution affected by a binary interaction. One thing is when a star becomes a red supergiant, it gets bigger, if another star is nearby to two will interact. This can reduce the expected number of red giants to one third of the expected number.</span></div>
<div dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;">
<span style="font-family: "arial"; font-size: small; line-height: 1.38; white-space: pre-wrap;"><br /></span></div>
<div dir="ltr" style="margin-bottom: 0pt; margin-top: 0pt;">
<div style="line-height: 1.38;">
<span style="font-family: "arial"; font-size: small; line-height: 1.38; white-space: pre-wrap;">What this means that at least if we see a red giant at least it's most likely a single star</span><span style="font-family: "arial"; font-size: small; line-height: 1.38; white-space: pre-wrap;"> when we see one! Al</span><span style="font-family: "arial" , "helvetica" , sans-serif; font-size: small; line-height: 1.38; white-space: pre-wrap;">so it means that stellar evolution is not the completed and finished subject that some people assume and there is still a number of mysteries.</span></div>
<div style="line-height: 1.38;">
<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: small; line-height: 1.38; white-space: pre-wrap;"><br /></span></div>
<div style="line-height: 1.38;">
<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: small; line-height: 1.38; white-space: pre-wrap;">Further reading:</span></div>
<span style="font-size: small;"><a href="http://adsabs.harvard.edu/abs/2000ApJ...538..837S" target="_blank"><span style="font-family: "arial" , "helvetica" , sans-serif;">Sugimoto & Fujimoto (2000)</span></a></span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: small; line-height: 20.24px; white-space: pre-wrap;"><a href="http://adsabs.harvard.edu/abs/2009PASA...26..203S" target="_blank">Stancliffe et al. (2009)</a></span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: small; line-height: 20.24px; white-space: pre-wrap;"><a href="http://adsabs.harvard.edu/abs/2012MNRAS.421.2713B" target="_blank">Ball et al. (2012) </a></span><br />
<span style="font-family: "arial"; font-size: small; line-height: 20.24px; white-space: pre-wrap;"><br /></span></div>
JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com0tag:blogger.com,1999:blog-7229687138516899224.post-30373863823800152182016-01-06T18:37:00.003-08:002016-01-07T00:44:56.983-08:00<h2>
<span style="font-size: small;"><b>Looking at the (astro)physics of the Starkiller base.</b></span> </h2>
[WARNING: Spoilers for the Force Awakens below!]<br />
<br />
So a friend recommended that instead of tweeting about the Starkiller base in "The Force Awakens" I should write a blog post and so people can avoid spoilers. A few weeks after that I've finally got around to writing my first ever blog post. Exciting! Wooo!<br />
<br />
I'm not sure what I'm going to write in this blog with time but I'm guessing looking at aspects of science in sci-fi as well as the study of stellar astrophysics. Mainly because they're both things I probably know most about.<br />
<br />
Anyway, <b>before you read on there are spoilers below for the movie "Star Wars: The Force Awakens"</b>. What I want to do is use the Starkiller base to discuss some aspects of stellar astrophysics as the base "takes the energy from a star and uses it to destroy a planet". I'm mostly going to be using what I saw in the movie in the discussion although I did check out the listing on <a href="http://starwars.wikia.com/wiki/Starkiller_Base">Wookieepedia</a> too.<br />
<br />
Also I'm not going to tear it all down and say "it can't work" I'm
going to say "well this is how it could work" given the technology
available in the Star Wars Universe. So what is the Starkiller base? Well here is a picture used in the promo-poster (it's really difficult to find any pictures of this thing):<br />
<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhTyg2dPonHsQEryzJsCTybHPXSQ7EGPBC-coWgZSZDpc38tCTEgh5yxbPlpiucrnO39AkhMUQvqz-qPr6w9G2wQ45a-z_T_1eRxbaM_YJMcPasMWwMB26qdcjh82Yvk1CBAciUv-TqTBkj/s1600/Weapon.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="221" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhTyg2dPonHsQEryzJsCTybHPXSQ7EGPBC-coWgZSZDpc38tCTEgh5yxbPlpiucrnO39AkhMUQvqz-qPr6w9G2wQ45a-z_T_1eRxbaM_YJMcPasMWwMB26qdcjh82Yvk1CBAciUv-TqTBkj/s320/Weapon.png" width="320" /></a></div>
<br />
<b>How would you build it</b>?<br />
<br />
It looks vaguely "Death Stary" but this time rather than being built as a separate space station it's actually built into a planet (notice the thin blue haze of an atmosphere at the edge). In fact during the movie the Death Star and Starkiller are compared in size and it's roughly of the right scale that the new base is probably slightly smaller about the size of Earth with a diameter of around 4000km (just guessing). This compares to the second Death Star which has a diameter of 900km (although numbers for this vary).<br />
<br />
The fact that there is such a big chunk of planet cut out of the planet to fit in the weapon means this weapon is classed as a "<a href="https://en.wikipedia.org/wiki/Megastructure#Planetary_scale_2" target="_blank">planetary scale megastructure</a>". It would be an enormous engineering feat, not just to dig the hole but to stop those cliffs from collapsing and to stop any geological activity on the surface. The Earth for example is a very active place with lots of volcanoes, Earth quakes and mountains. You would also have to drill down into the core and try to keep the hole from collapsing.<br />
<br />
To get around this we can assume that material science and "force-field" technology makes this possible. We can should also assume that if the planet is small, i.e. Mars size, it would be geologically inactive. In our solar system both Mercury and Mars are thought to be mostly geologically inactive and mostly solid without a molten core like Venus and Earth. This is because small objects cool down faster than big objects because they have a higher surface are to volume ratio.<br />
<br />
<b>How would you power the weapon by a star?</b><br />
<br />
So if we have advanced enough technology and we find the right planet, we can build the base. So what about how the weapon works? According to <a href="http://starwars.wikia.com/wiki/Starkiller_Base">Wookieepedia</a> and the film's novel (<a href="http://www.businessinsider.com/heres-how-starkiller-base-weapon-works-star-wars-2015-12" target="_blank">discussed here</a>, it was written by Kevin J Anderson and is disappointing because he came up with the "Kliss torch" a reasonably accurate stellar weapon but that’s for a later blogpost) the base uses a star to collect dark energy that is stored in a containment unit in the base's core until the weapon is ready to be fired....<br />
<br />
Okay, so dark energy does exist, it's the reason the Universe is expanding except you won't find very much of it in a star or anywhere in a galaxy. You need a very large volume of space, like in the space between galaxies for it to do anything. Also there isn't much dark matter in star either, so it's not that either.<br />
<br />
Fortunately we don't need to be so exotic stars contain an enormous amount of energy. So let us assume that the Starkiller base is designed to use stars like our Sun. This is a good guess as there are a lot of these stars and the star in the movie looked yellow with a convective surface. These both describe our Sun (although our Sun's colour is actually white but that's a discussion for another time).<br />
<br />
If that is the case such a star has a luminosity of 3.85×10<sup>26</sup> Watts. That's quite alot of energy, it's that many Joules of energy a second. Compare that to your 10 Watt florescent light bulbs lighting you homes. The energy of stars is created at the centre in nuclear fusion reactions converting the simplest element hydrogen into the next element helium. But this energy can't get from the centre to the surface instantly as there is the rest of the star in the way! The energy in the star is in two forms, radiation (i.e. light) and thermal energy of the material in the star.<br />
<br />
Now before we go further we have to make some assumptions as to what the Starkiller base actually takes from a star to charge itself. A stellar interior is hot and a good estimate for the amount of energy inside in both heat and light is the luminosity multiplied by its "thermal timescale". This is a number that tells us how long it takes for the star to transport energy and for the Sun is about 20 million years. This is about 2×10<sup>41</sup> Joules, to give you a reference point it takes 400,000 Joules to raise the temperature of cold water to its boiling point. Most of this energy is in the thermal energy of the stellar material, a smaller fraction of energy is stored as light.<br />
<br />
So there is certainly enough energy, the interesting question is how much do we need to destroy a few planets as in the movie? A planet is held together by gravity and to "explode" it you would need around the amount of gravitational potential energy stored in the planet, for an Earth like world this is of the order of about 10<sup>32</sup> Joules. Therefore we only need maybe a billionth of the thermal energy of a star to destroy a few planets.<br />
<br />
<b>Getting heavy with gravity.</b> <br />
<br />
This is an important point as during the movie you don't see the gravity of the Starkiller base changing as it charges. If the base was to gobble up all the mass of the Sun its mass would increase and so to would the gravity, even if there were gravity compensators. The problem is the Sun is 335,000 times the mass of the Earth. If you put all the mass of the Sun at the centre of Earth the gravity would increase by that amount and we would all be squished!<br />
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Even if we just took the "thermal energy" there would also be a problem as this has an associated mass due to the laws of Relativity via E=mc<sup>2</sup>. The mass of all the energy in the Sun is about the same as the mass of the Earth! So the gravity should at least double if all the energy was taken! So both these points mean that not all the energy of the star needs to be taken and in fact not much mass needs to be taken from the star to get the energy.<br />
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<b>What about stellar astrophysics?</b><br />
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So the final question, how do we suck out the energy from the star? Well in the movie we see a stream of material flowing towards the planet. The good news is we know stars actually do this! When I first saw this in the movie I realised it's going to make explaining mass transfer in binary stars much easier in lectures.<br />
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A star can grow to such a size that the outermost parts of the star fall under the influence of a companion star's gravity and so material is transferred across. Now the good news is that in the Star Wars Universe they clearly have artificial gravity, so you can imaging using some sort of gravity projector or gravity probes/satellites to attract material from the star. Anyway they only need a billionth of mass from the stellar surface, around 2×10<sup>21</sup>kgs (1/3000th of an Earth mass) to have enough energy to destroy a few planets.<br />
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Now we actually understand how stars respond to mass loss quite well because as mentioned above stars do this all the time in binary systems. The problem is with a convective surface the star should expand as you remove mass from the surface. So the star should get bigger and brighter! We don't see this in the movie, why? Well the star takes time to respond, to rapid mass loss it is the dynamic timescale of a star that is important. This is the time it would take for a star to collapse in on itself if there was nothing to stop it. For the Sun it's about 30 minutes. So for the star to shrink as we take mass off we need to do it in about this time or shorter. Luckily this is about the time it takes in the movie.<br />
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The problem being is that once the weapon stops charging the star is going to react and "bounce" back. Although it will take longer to get brighter again and for energy to flow back into the outermost layers. This will not happen on the dynamic time-scale but on the thermal time-scale of 20 million years! So this is why the Starkiller base has to keep travelling to different stars to charge. Although they can go back and reuse the same star after that, rather long, time.<br />
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<b>And finally...</b><br />
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We could also ask how does the base fire and get its energy to the target. I am going to avoid that question, wave my arms and say "wormholes/hyperspace". With releasing all that energy into the wormhole where it might be accelerated so it hits the target as a beam (I say not just waving my arms but flapping them vigorously).<br />
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So in summary, with the technology of the Star Wars Universe the Starkiller base is probably "possible". There are some issues with how the star would react but there is also plenty of energy available without having to go to any "dark energy". Although how you deliver the weapon is way beyond anything we could do today.<br />
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I hope that was interesting, as I mentioned about there is another superweapon, the "Kliss torch" which I might discuss in a future blog post. I also plan to write about how massive stars can be, why stars become red supergiants and other interesting stellar astrophysicsy stuff. Let me know if you have any requests!JJhttp://www.blogger.com/profile/04529626188603471076noreply@blogger.com3