https://selfgravitatingfluids.education/JETohline/index.php?action=history&feed=atom&title=SSC%2FStructure%2FStahlerMassRadius 2026-04-22T15:29:22Z Revision history for this page on the wiki MediaWiki 1.43.1 https://selfgravitatingfluids.education/JETohline/index.php?title=SSC/Structure/StahlerMassRadius&diff=2348&oldid=prev 2024-07-19T18:53:12Z

<p><span class="autocomment">Review</span></p> <table style="background-color: #fff; color: #202122;" data-mw="interface"> <col class="diff-marker" /> <col class="diff-content" /> <col class="diff-marker" /> <col class="diff-content" /> <tr class="diff-title" lang="en"> <td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">← Older revision</td> <td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">Revision as of 14:53, 19 July 2024</td> </tr><tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l4">Line 4:</td> <td colspan="2" class="diff-lineno">Line 4:</td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>==Review==</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>==Review==</div></td></tr> <tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>In [[SSC/Structure/PolytropesEmbedded#Embedded_Polytropic_Spheres|an accompanying chapter that discusses detailed force-balanced models of embedded (and pressure-truncated) polytropes<del style="font-weight: bold; text-decoration: none;">]]</del>, we <del style="font-weight: bold; text-decoration: none;">review [http://adsabs.harvard.edu/abs/1983ApJ...268..165S S. W. Stahler's (1983)] </del>pair of parametric [[SSC/Structure/PolytropesEmbedded#Stahler.27s_Presentation|relations for the equilibrium mass and equilibrium radius]] for such systems, namely,</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>In [[SSC/Structure/PolytropesEmbedded#Embedded_Polytropic_Spheres|an accompanying chapter<ins style="font-weight: bold; text-decoration: none;">]] </ins>that discusses detailed force-balanced models of embedded (and pressure-truncated) polytropes, we <ins style="font-weight: bold; text-decoration: none;">have summarized the derivation by {{ Stahler83full }} of the </ins>pair of parametric [[SSC/Structure/PolytropesEmbedded#Stahler.27s_Presentation|relations for the equilibrium mass and equilibrium radius]] for such systems, namely,</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;div align=&quot;center&quot;&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;div align=&quot;center&quot;&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;table border=&quot;0&quot; cellpadding=&quot;3&quot;&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;table border=&quot;0&quot; cellpadding=&quot;3&quot;&gt;</div></td></tr> <tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l11">Line 11:</td> <td colspan="2" class="diff-lineno">Line 11:</td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;td align=&quot;right&quot;&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;td align=&quot;right&quot;&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;math&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;math&gt;</div></td></tr> <tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">~</del>M</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>M</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;/math&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;/math&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;/td&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;/td&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;td align=&quot;center&quot;&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;td align=&quot;center&quot;&gt;</div></td></tr> <tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>&lt;math&gt;<del style="font-weight: bold; text-decoration: none;">~</del>=<del style="font-weight: bold; text-decoration: none;">~</del>&lt;/math&gt;</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>&lt;math&gt;=&lt;/math&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;/td&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;/td&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;td align=&quot;left&quot;&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;td align=&quot;left&quot;&gt;</div></td></tr> <tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l28">Line 28:</td> <td colspan="2" class="diff-lineno">Line 28:</td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;td align=&quot;right&quot;&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;td align=&quot;right&quot;&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;math&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;math&gt;</div></td></tr> <tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">~</del>R_\mathrm{eq}</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>R_\mathrm{eq}</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;/math&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;/math&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;/td&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;/td&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;td align=&quot;center&quot;&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;td align=&quot;center&quot;&gt;</div></td></tr> <tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>&lt;math&gt;<del style="font-weight: bold; text-decoration: none;">~</del>=<del style="font-weight: bold; text-decoration: none;">~</del>&lt;/math&gt;</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>&lt;math&gt;=&lt;/math&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;/td&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;/td&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;td align=&quot;left&quot;&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>   &lt;td align=&quot;left&quot;&gt;</div></td></tr> <tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l49">Line 49:</td> <td colspan="2" class="diff-lineno">Line 49:</td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;div align=&quot;center&quot;&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;div align=&quot;center&quot;&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;math&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;math&gt;</div></td></tr> <tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>R_\mathrm{SWS} = \biggl( \frac{n+1}{nG} \biggr)^{1/2} K_n^{n/(n+1)} P_\mathrm{e}^{(1-n)/[2(n+1)]} \, <del style="font-weight: bold; text-decoration: none;">,</del></div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>R_\mathrm{SWS} = \biggl( \frac{n+1}{nG} \biggr)^{1/2} K_n^{n/(n+1)} P_\mathrm{e}^{(1-n)/[2(n+1)]} \, <ins style="font-weight: bold; text-decoration: none;">.</ins></div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;/math&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;/math&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;/div&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;/div&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr> <tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">and point out that </del>[<del style="font-weight: bold; text-decoration: none;">http:</del>//<del style="font-weight: bold; text-decoration: none;">adsabs.harvard.edu</del>/<del style="font-weight: bold; text-decoration: none;">abs/1983ApJ...268..165S Stahler (1983)</del>] (see his equation B13) <del style="font-weight: bold; text-decoration: none;">explicitly states </del>that [[SSC/Structure/PolytropesEmbedded#Overlap_with_Stahler.27s_Presentation_2|the relevant mass-radius relationship]] for &lt;math&gt;~n = 5&lt;/math&gt; embedded polytropes is,</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">As </ins>[<ins style="font-weight: bold; text-decoration: none;">[SSC</ins>/<ins style="font-weight: bold; text-decoration: none;">Structure</ins>/<ins style="font-weight: bold; text-decoration: none;">PolytropesEmbedded</ins>/<ins style="font-weight: bold; text-decoration: none;">n5#Overlap_with_Stahler's_Presentation|we also have reviewed]</ins>]<ins style="font-weight: bold; text-decoration: none;">, {{ Stahler83 }} &amp;#8212; hereafter, {{ Stahler83hereafter }} &amp;#8212; also explicitly states </ins>(see his equation B13) that [[SSC/Structure/PolytropesEmbedded#Overlap_with_Stahler.27s_Presentation_2|the relevant mass-radius relationship]] for &lt;math&gt;~n = 5&lt;/math&gt; embedded polytropes is,</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;div align=&quot;center&quot;&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;div align=&quot;center&quot;&gt;</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;table border=&quot;0&quot; cellpadding=&quot;3&quot;&gt;</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>&lt;table border=&quot;0&quot; cellpadding=&quot;3&quot;&gt;</div></td></tr> </table>

Joel2 https://selfgravitatingfluids.education/JETohline/index.php?title=SSC/Structure/StahlerMassRadius&diff=2204&oldid=prev 2024-07-11T23:07:52Z

<p>Created page with &quot;__FORCETOC__ =Stahler&#039;s Mass-Radius Relationship for Embedded Polytropes= ==Review== In <a href="/JETohline/index.php/SSC/Structure/PolytropesEmbedded#Embedded_Polytropic_Spheres" title="SSC/Structure/PolytropesEmbedded">an accompanying chapter that discusses detailed force-balanced models of embedded (and pressure-truncated) polytropes</a>, we review [http://adsabs.harvard.edu/abs/1983ApJ...268..165S S. W. Stahler&#039;s (1983)] pair of parametric SSC/Structure/PolytropesEmbedded#Stahler.27s_Presentation|relations for the equilibrium mass an...&quot;</p> <p><b>New page</b></p><div>__FORCETOC__<br /> <br /> =Stahler&#039;s Mass-Radius Relationship for Embedded Polytropes=<br /> <br /> ==Review==<br /> In [[SSC/Structure/PolytropesEmbedded#Embedded_Polytropic_Spheres|an accompanying chapter that discusses detailed force-balanced models of embedded (and pressure-truncated) polytropes]], we review [http://adsabs.harvard.edu/abs/1983ApJ...268..165S S. W. Stahler&#039;s (1983)] pair of parametric [[SSC/Structure/PolytropesEmbedded#Stahler.27s_Presentation|relations for the equilibrium mass and equilibrium radius]] for such systems, namely,<br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;3&quot;&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;<br /> ~M<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=~&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;<br /> M_\mathrm{SWS} \biggl( \frac{n^3}{4\pi} \biggr)^{1/2} \biggl\{ \theta_n^{(n-3)/2} \xi^2 <br /> \biggl| \frac{d\theta_n}{d\xi} \biggr| \biggr\}_{\xi_e}<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;<br /> ~R_\mathrm{eq}<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=~&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;<br /> R_\mathrm{SWS} \biggl( \frac{n}{4\pi} \biggr)^{1/2} \biggl\{ \xi \theta_n^{(n-1)/2} \biggr\}_{\xi_e}<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> where,<br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;math&gt;M_\mathrm{SWS} = <br /> \biggl( \frac{n+1}{nG} \biggr)^{3/2} K_n^{2n/(n+1)} P_\mathrm{e}^{(3-n)/[2(n+1)]} \, ,&lt;/math&gt;<br /> &lt;/div&gt;<br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;math&gt;<br /> R_\mathrm{SWS} = \biggl( \frac{n+1}{nG} \biggr)^{1/2} K_n^{n/(n+1)} P_\mathrm{e}^{(1-n)/[2(n+1)]} \, ,<br /> &lt;/math&gt;<br /> &lt;/div&gt;<br /> <br /> and point out that [http://adsabs.harvard.edu/abs/1983ApJ...268..165S Stahler (1983)] (see his equation B13) explicitly states that [[SSC/Structure/PolytropesEmbedded#Overlap_with_Stahler.27s_Presentation_2|the relevant mass-radius relationship]] for &lt;math&gt;~n = 5&lt;/math&gt; embedded polytropes is,<br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;3&quot;&gt;<br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;<br /> \biggl( \frac{M}{M_\mathrm{SWS}} \biggr)^2 - 5 \biggl( \frac{M}{M_\mathrm{SWS}} \biggr)\biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)<br /> + \frac{20\pi}{3} \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^4<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=~&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;<br /> ~0 \, .<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> <br /> In what was intended to be a complementary discussion, our [[SSC/Virial/Polytropes#Nonrotating_Adiabatic_Configuration_Embedded_in_an_External_Medium|free-energy analysis of embedded polytropes]] produced a virial equilibrium expression of the general form,<br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;math&gt;<br /> \mathcal{A} - \mathcal{B}\chi_\mathrm{eq}^{4 -3\gamma_g} +~ \mathcal{D}\chi_\mathrm{eq}^4 = 0 \, ,<br /> &lt;/math&gt;<br /> &lt;/div&gt;<br /> where,<br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot;&gt;<br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~\chi_\mathrm{eq}&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~\equiv&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;\frac{R_\mathrm{eq}}{R_\mathrm{norm}} <br /> \, ,&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~\mathcal{A}&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~\equiv&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;\frac{1}{5} \cdot \biggl[ \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{tot}} \biggr) <br /> \frac{1}{\tilde\mathfrak{f}_M} \biggr]^2 \cdot \tilde\mathfrak{f}_W \, ,&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~\mathcal{B}&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~\equiv&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;<br /> \frac{4\pi}{3} <br /> \biggl[ \frac{3}{4\pi} \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{tot}}\biggr) \frac{1}{\tilde\mathfrak{f}_M} \biggr]_\mathrm{eq}^{\gamma}<br /> \cdot \tilde\mathfrak{f}_A \, ,<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~\mathcal{D}&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~\equiv&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;<br /> \biggl( \frac{4\pi}{3} \biggr) \frac{P_e}{P_\mathrm{norm}} \, ,<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> and,<br /> <br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~R_\mathrm{norm}&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~\equiv&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \biggl[ \biggl( \frac{G}{K} \biggr) M_\mathrm{tot}^{2-\gamma_g} \biggr]^{1/(4-3\gamma_g)} <br /> =\biggl[ \biggl( \frac{G}{K} \biggr)^n M_\mathrm{tot}^{(n-1)} \biggr]^{1/(n-3)}<br /> \, ,&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~P_\mathrm{norm}&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~\equiv&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \biggl[ \frac{K^4}{G^{3\gamma_g} M_\mathrm{tot}^{2\gamma_g}} \biggr]^{n/(n-3)} <br /> = \biggl[ \frac{K^{4n}}{G^{3(n+1)} M_\mathrm{tot}^{2(n+1)}} \biggr]^{1/(n-3)} <br /> \, ,&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> and,<br /> <br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;1&quot; align=&quot;center&quot; cellpadding=&quot;5&quot;&gt;<br /> &lt;tr&gt;&lt;th align=&quot;center&quot; colspan=&quot;1&quot;&gt;<br /> Structural Form Factors for &lt;font color=&quot;red&quot;&gt;Pressure-Truncated&lt;/font&gt; Polytropes<br /> &lt;/th&gt;&lt;/tr&gt;<br /> &lt;tr&gt;&lt;td align=&quot;center&quot;&gt;<br /> <br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~\tilde\mathfrak{f}_M&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~ \biggl[ - \frac{3\Theta^&#039;}{\xi} \biggr]_{\tilde\xi} &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;\tilde\mathfrak{f}_W &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~\frac{3^2\cdot 5}{5-n} \biggl[ \frac{\Theta^&#039;}{\xi} \biggr]^2_{\tilde\xi} &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;\tilde\mathfrak{f}_A &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;<br /> \frac{3(n+1) }{(5-n)} ~\biggl[ \Theta^&#039; \biggr]^2_{\tilde\xi} + \tilde\Theta^{n+1}<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> <br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> When we went back to compare the mass-radius relationship that results from our very general virial equilibrium expression to the one published by Stahler for pressure-truncated &lt;math&gt;~n = 5&lt;/math&gt; polytropes, they did not appear to agree. In what follows, we methodically plow through this comparison in considerable detail to uncover whatever discrepancies might exist.<br /> <br /> ==Comparison==<br /> First, let&#039;s insert the definitions of the coefficients &lt;math&gt;~\mathcal{A}&lt;/math&gt;, &lt;math&gt;~\mathcal{B}&lt;/math&gt;, and &lt;math&gt;~\mathcal{C}&lt;/math&gt; into the virial equilibrium expression, replacing, where necessary, the adiabatic exponent in favor of the polytropic index, using the relation, &lt;math&gt;~\gamma_g = (n+1)/n&lt;/math&gt;.<br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~0&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~\mathcal{A} - \mathcal{B}\chi_\mathrm{eq}^{(n-3)/n} +~ \mathcal{D}\chi_\mathrm{eq}^4&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \frac{1}{5} \cdot \biggl[ \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{tot}} \biggr) <br /> \frac{1}{\tilde\mathfrak{f}_M} \biggr]^2 \cdot \tilde\mathfrak{f}_W <br /> ~-~ \frac{4\pi}{3} <br /> \biggl[ \frac{3}{4\pi} \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{tot}}\biggr) \frac{1}{\tilde\mathfrak{f}_M} \biggr]_\mathrm{eq}^{(n+1)/n}<br /> \cdot \tilde\mathfrak{f}_A \biggl(\frac{R_\mathrm{eq}}{R_\mathrm{norm}}\biggr)^{(n-3)/n} <br /> +~ \biggl( \frac{4\pi}{3} \biggr) \frac{P_e}{P_\mathrm{norm}} \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{norm}}\biggr) ^4<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> <br /> Next, explicitly spelling out as well the definitions of our adopted normalization radius and normalization pressure &amp;#8212; recognizing that &lt;math&gt;~P_\mathrm{norm} R_\mathrm{norm}^4 = GM^2_\mathrm{tot}&lt;/math&gt; &amp;#8212; and multiply the expression through by &lt;math&gt;[3GM_\mathrm{tot}^2/(4\pi)]&lt;/math&gt;. <br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~0&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \frac{3}{20\pi} \biggl( \frac{\tilde\mathfrak{f}_W}{\tilde\mathfrak{f}_M^2} \biggr) GM_\mathrm{limit}^2 <br /> ~-~ GM_\mathrm{tot}^2<br /> \biggl[ \frac{3}{4\pi} \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{tot}}\biggr) \biggr]_\mathrm{eq}^{(n+1)/n}<br /> \biggl[ \frac{\tilde\mathfrak{f}_A}{\tilde\mathfrak{f}_M^{(n+1)/n}} \biggr] <br /> \biggl[ \biggl( \frac{K}{G} \biggr) M_\mathrm{tot}^{(1-n)/n} \biggr] R_\mathrm{eq}^{(n-3)/n}<br /> +~ P_e R_\mathrm{eq}^4<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \frac{3}{20\pi} \biggl( \frac{\tilde\mathfrak{f}_W}{\tilde\mathfrak{f}_M^2} \biggr) GM_\mathrm{limit}^2 <br /> ~-~ K<br /> \biggl[ \frac{3}{4\pi} \cdot \frac{M_\mathrm{limit}}{\tilde\mathfrak{f}_M} \biggr]_\mathrm{eq}^{(n+1)/n} \mathfrak{f}_A<br /> R_\mathrm{eq}^{(n-3)/n}<br /> +~ P_e R_\mathrm{eq}^4 \, .<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> As has been pointed out in our separate, [[SSC/Virial/Polytropes#Solution_Expressed_in_Terms_of_K_and_M_.28Whitworth.27s_1981_Relation.29|more general discussion of the virial equilibrium of polytropes]], if we multiply this expression through by &lt;math&gt;~R_\mathrm{eq}^{-4}&lt;/math&gt;, set all three structural form factors, &lt;math&gt;~\mathfrak{f}_i&lt;/math&gt;, equal to unity, and replace &lt;math&gt;~M_\mathrm{limit}&lt;/math&gt; with the notation, &lt;math&gt;~M_0&lt;/math&gt;, the expression exactly matches the one presented as equation (5) of [http://adsabs.harvard.edu/abs/1981MNRAS.195..967W Whitworth], which reads:<br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;2&quot;&gt;<br /> &lt;tr&gt;&lt;td&gt;<br /> [[File:Whitworth1981Eq5.jpg|500px|center|Whitworth (1981, MNRAS, 195, 967)]]<br /> &lt;/td&gt;&lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> <br /> But I like this last version of our derived expression as well because it shows some resemblance to the mass-radius relationship presented by Stahler and highlighted above: The first term on the left-hand-side is a constant times the square of the mass; the third term is a constant times the fourth power of the equilibrium radius; and the middle term shows a cross-product of the mass and radius (in our case, each is raised to a power other than unity). In an effort to make the comparison with Stahler even clearer, let&#039;s rewrite our expression in terms of the mass and equilibrium radius, normalized respectively to &lt;math&gt;~M_\mathrm{SWS}&lt;/math&gt; and &lt;math&gt;~R_\mathrm{SWS}&lt;/math&gt;. <br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~0&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \frac{3G}{20\pi} \biggl( \frac{\tilde\mathfrak{f}_W}{\tilde\mathfrak{f}_M^2} \biggr) \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^2<br /> \biggl[ \biggl( \frac{n+1}{nG} \biggr)^{3/2} K_n^{2n/(n+1)} P_\mathrm{e}^{(3-n)/[2(n+1)]} \biggr]^2 <br /> ~+~ P_e \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^4 \biggl[ \biggl( \frac{n+1}{nG} \biggr)^{1/2} K_n^{n/(n+1)} P_\mathrm{e}^{(1-n)/[2(n+1)]} \biggr]^4 <br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> ~-~ K \mathfrak{f}_A<br /> \biggl[ \frac{3}{4\pi} \cdot \frac{1}{\tilde\mathfrak{f}_M} \biggr]^{(n+1)/n} \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^{(n+1)/n}<br /> \biggl[ \biggl( \frac{n+1}{nG} \biggr)^{3/2} K_n^{2n/(n+1)} P_\mathrm{e}^{(3-n)/[2(n+1)]} \biggr]^{(n+1)/n}<br /> \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^{(n-3)/n} \biggl[ \biggl( \frac{n+1}{nG} \biggr)^{1/2} K_n^{n/(n+1)} P_\mathrm{e}^{(1-n)/[2(n+1)]} \biggr]^{(n-3)/n}<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \frac{3}{20\pi} \biggl( \frac{n+1}{n} \biggr)^{3} \biggl( \frac{\tilde\mathfrak{f}_W}{\tilde\mathfrak{f}_M^2} \biggr) \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^2<br /> \biggl[ K_n^{4n} P_\mathrm{e}^{(3-n)} \biggr]^{1/(n+1)} G^{-2}<br /> ~+~ \biggl( \frac{n+1}{n} \biggr)^{2} \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^4 \biggl[ K_n^{4n} P_\mathrm{e}^{[(n+1)+2(1-n)]} \biggr]^{1/(n+1)} G^{-2}<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> ~-~\mathfrak{f}_A<br /> \biggl[ \frac{3}{4\pi} \cdot \frac{1}{\tilde\mathfrak{f}_M} \biggr]^{(n+1)/n} \biggl( \frac{n+1}{nG} \biggr)^{[3(n+1)+(n-3)]/2n} <br /> \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^{(n+1)/n}<br /> \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^{(n-3)/n} <br /> \biggl[ K^{1 + 2 + (n-3)/(n+1)} \biggr] \biggl[ P_\mathrm{e}^{(3-n) + (1-n)(n-3)/(n+1) } \biggr]^{1/(2n)}<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \frac{3}{20\pi} \biggl( \frac{n+1}{n} \biggr)^{3} \biggl( \frac{\tilde\mathfrak{f}_W}{\tilde\mathfrak{f}_M^2} \biggr) \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^2<br /> \biggl[ K_n^{4n} P_\mathrm{e}^{(3-n)} \biggr]^{1/(n+1)} G^{-2}<br /> ~+~ \biggl( \frac{n+1}{n} \biggr)^{2} \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^4 \biggl[ K_n^{4n} P_\mathrm{e}^{(3-n)} \biggr]^{1/(n+1)} G^{-2}<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> ~-~\mathfrak{f}_A<br /> \biggl[ \frac{3}{4\pi} \cdot \frac{1}{\tilde\mathfrak{f}_M} \biggr]^{(n+1)/n} \biggl( \frac{n+1}{n} \biggr)^{2} <br /> \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^{(n+1)/n}<br /> \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^{(n-3)/n} <br /> \biggl[ K^{4n/(n+1)} \biggr] \biggl[ P_\mathrm{e}^{(3-n)/(n+1) } \biggr] G^{-2}<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \frac{3}{20\pi} \biggl( \frac{n+1}{n} \biggr) \biggl( \frac{\tilde\mathfrak{f}_W}{\tilde\mathfrak{f}_M^2} \biggr) \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^2<br /> ~-~\mathfrak{f}_A<br /> \biggl[ \frac{3}{4\pi} \cdot \frac{1}{\tilde\mathfrak{f}_M} \biggr]^{(n+1)/n} <br /> \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^{(n+1)/n}<br /> \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^{(n-3)/n} <br /> ~+~ \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^4 <br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> <br /> On 30 September 2014, J.E. Tohline showed that this expression is perfectly satisfied using Stahler&#039;s definitions of the normalized mass and normalized equilibrium radius along with Tohline&#039;s definitions of the structural form factors. The middle term on the right-hand side includes the structural form factor, &lt;math&gt;~\mathfrak{f}_A&lt;/math&gt;, which in turn is the sum of two pieces; the first piece of this form factor supplies the term that cancels the first term on the right-hand side of the equilibrium expression and the second piece cancels the third term on the right-hand side. We have noticed that the first term on the right-hand side (via the factor, &lt;math&gt;~\mathfrak{f}_W&lt;/math&gt;) and the first portion of the middle term (via the first term in the expression for &lt;math&gt;~\mathfrak{f}_A&lt;/math&gt;), contain factors of &lt;math&gt;~(5-n)^{-1}&lt;/math&gt;, which will cause these terms to blow up when considering truncated polytropes of index, &lt;math&gt;~n = 5&lt;/math&gt;. But this is precisely the case for which Stahler provides an analytic mass-radius relationship. What happens to the virial expression if we multiply through by &lt;math&gt;~(5-n)&lt;/math&gt;? <br /> <br /> ==Experimentation==<br /> <br /> ===First Finding===<br /> <br /> Let&#039;s break the form factor, &lt;math&gt;~\mathfrak{f}_A&lt;/math&gt;, into two distinct pieces, namely,<br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;\tilde\mathfrak{f}_{A1} &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~\equiv&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;<br /> \frac{3(n+1) }{(5-n)} ~\biggl[ \Theta^&#039; \biggr]^2_{\tilde\xi} \, ,<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;\tilde\mathfrak{f}_{A2} &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~\equiv&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;<br /> \tilde\Theta^{n+1} \, ,<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> then multiply the virial equilibrium expression through by &lt;math&gt;~(5-n)&lt;/math&gt;.<br /> <br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~0&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \frac{3}{20\pi} \biggl( \frac{n+1}{n} \biggr) \biggl[ \frac{(5-n)\tilde\mathfrak{f}_W}{\tilde\mathfrak{f}_M^2} \biggr] <br /> \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^2<br /> ~-~[(5-n)\mathfrak{f}_{A1} + (5-n)\mathfrak{f}_{A2}]<br /> \biggl[ \frac{3}{4\pi} \cdot \frac{1}{\tilde\mathfrak{f}_M} \biggr]^{(n+1)/n} <br /> \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^{(n+1)/n}<br /> \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^{(n-3)/n} <br /> ~+~ (5-n)\biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^4 <br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \frac{3}{4\pi} \biggl( \frac{n+1}{n} \biggr) \biggl\{<br /> \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^2<br /> ~-~\frac{n}{(4\pi)^{1/n}} (\tilde\theta&#039;)^2 \biggl[ \frac{3}{\tilde\mathfrak{f}_M} \biggr]^{(n+1)/n} <br /> \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^{(n+1)/n}<br /> \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^{(n-3)/n} \biggr\}<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> ~-~(5-n)\biggl[ \tilde\theta^{n+1}<br /> \biggl( \frac{3}{4\pi} \cdot \frac{1}{\tilde\mathfrak{f}_M} \biggr)^{(n+1)/n} <br /> \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^{(n+1)/n}<br /> \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^{(n-3)/n} <br /> ~+~ \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^4 \biggr]<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> <br /> When &lt;math&gt;~(n=5)&lt;/math&gt;, the entire term that appears in the second line of this expression goes to zero. The remaining set of terms (that is, the first line of the expression) give,<br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~<br /> \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^2<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \frac{n(\tilde\theta&#039;)^2 }{(4\pi)^{1/n}} \biggl[ \frac{3}{\tilde\mathfrak{f}_M} \biggr]^{(n+1)/n} <br /> \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^{(n+1)/n}<br /> \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^{(n-3)/n}<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \frac{5(\tilde\theta&#039;)^2 }{(4\pi)^{1/5}} \biggl[ \frac{3}{\tilde\mathfrak{f}_M} \biggr]^{6/5} <br /> \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^{6/5}<br /> \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^{2/5}<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~\Rightarrow~~~<br /> \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^4 \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^{-2}<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \frac{5^5(\tilde\theta&#039;)^{10} }{(4\pi)} \biggl[ \frac{3}{\tilde\mathfrak{f}_M} \biggr]^{6} <br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \biggl(\frac{5^5}{4\pi}\biggr) \tilde\xi^6 (\tilde\theta&#039;)^{4} <br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~\Rightarrow~~~<br /> \biggl( \frac{M_\mathrm{limit}}{M_\mathrm{SWS}} \biggr)^2 \biggl( \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \biggr)^{-1}<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \biggl(\frac{5^5}{4\pi}\biggr)^{1/2} \tilde\xi^3 (\tilde\theta&#039;)^{2} \, .<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> It is straightforward to show that, when &lt;math&gt;~n&lt;/math&gt; is set equal to &lt;math&gt;~5&lt;/math&gt;, Stahler&#039;s expressions for the normalized mass and normalized radius satisfy this relation.<br /> <br /> ===Second Finding===<br /> <br /> To simplify our expressions, let&#039;s write Stahler&#039;s normalized mass and normalized radius as, respectively,<br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~M_n \equiv \frac{M_\mathrm{limit}}{M_\mathrm{SWS}}&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &amp;nbsp;&amp;nbsp;&amp;nbsp;&amp;nbsp;<br /> and<br /> &amp;nbsp;&amp;nbsp;&amp;nbsp;&amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~R_n \equiv \frac{R_\mathrm{eq}}{R_\mathrm{SWS}} \, .&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> Then insert the ratio, &lt;math&gt;~\tilde\mathfrak{f}_W/\tilde\mathfrak{f}_M^2 = 5/(5-n)&lt;/math&gt;, into the first term of the virial equilibrium expression and rearrange the terms:<br /> <br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;<br /> \frac{3}{20\pi} \biggl[ \frac{5(n+1)}{n(5-n)} \biggr] M_n^2<br /> ~+~ R_n^4<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> ~\mathfrak{f}_A<br /> \biggl[ \frac{3}{4\pi} \cdot \frac{1}{\tilde\mathfrak{f}_M} \biggr]^{(n+1)/n} <br /> M_n^{(n+1)/n} R_n^{(n-3)/n} \, .<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> <br /> Next, given Stahler&#039;s expressions for the normalized mass and normalized radius, can we develop an expression for the ratio, &lt;math&gt;~\tilde\mathfrak{f}_A/\tilde\mathfrak{f}_M^{(n+1)/n}&lt;/math&gt;, that is only in terms of Stahler&#039;s mass and radius? Well, first notice that,<br /> <br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~\tilde\theta^{n+1}&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~4\pi n (-\tilde\theta&#039;)^2 \cdot \frac{R_n^4}{M_n^2} \, ,&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> so we can write,<br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~\tilde\mathfrak{f}_A&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~(\tilde\theta&#039;)^2<br /> \biggl[ \frac{3(n+1)}{(5-n)} + 4\pi n \cdot \frac{R_n^4}{M_n^2} \biggr] \, .<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> Then notice that,<br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~\tilde\xi^{n+1}&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~(4\pi) n^{-n} (-\tilde\theta&#039;)^{1-n} R_n^{3-n} M_n^{n-1} \, ,&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> so,<br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~\tilde\mathfrak{f}_M^{-(n+1)/n}&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~(\tilde\theta&#039;)^{-2} <br /> \biggl[ (4\pi) 3^{-(n+1)} n^{-n} R_n^{3-n} M_n^{n-1} \biggr]^{1/n}<br /> &lt;/math&gt; &amp;nbsp;&amp;nbsp;&amp;nbsp;&amp;nbsp; and,<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;~\tilde\mathfrak{f}_A \biggl[ \biggl( \frac{3}{4\pi}\biggr)\frac{1}{\tilde\mathfrak{f}_M} \biggr]^{(n+1)/n}&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \biggl[ \frac{3(n+1)}{4\pi n (5-n)} + \frac{R_n^4}{M_n^2} \biggr]<br /> \biggl[ R_n^{3-n} M_n^{n-1} \biggr]^{1/n} \, .<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> Hence, the virial equilibrium expression becomes,<br /> <br /> <br /> &lt;div align=&quot;center&quot;&gt;<br /> &lt;table border=&quot;0&quot; cellpadding=&quot;5&quot; align=&quot;center&quot;&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &lt;math&gt;<br /> \biggl[ \frac{3(n+1)}{4\pi n(5-n)} \biggr] M_n^2<br /> ~+~ R_n^4<br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \biggl[ \frac{3(n+1)}{4\pi n (5-n)} + \frac{R_n^4}{M_n^2} \biggr]<br /> \biggl[ R_n^{3-n} M_n^{n-1} \biggr]^{1/n}<br /> M_n^{(n+1)/n} R_n^{(n-3)/n} <br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> <br /> &lt;tr&gt;<br /> &lt;td align=&quot;right&quot;&gt;<br /> &amp;nbsp;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;center&quot;&gt;<br /> &lt;math&gt;~=&lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;td align=&quot;left&quot;&gt;<br /> &lt;math&gt;~<br /> \biggl[ \frac{3(n+1)}{4\pi n (5-n)} + \frac{R_n^4}{M_n^2} \biggr]M_n^2 \, . <br /> &lt;/math&gt;<br /> &lt;/td&gt;<br /> &lt;/tr&gt;<br /> &lt;/table&gt;<br /> &lt;/div&gt;<br /> Q.E.D. Just not sure what I&#039;ve really accomplished here!<br /> <br /> <br /> {{ SGFfooter }}</div>

Joel2