Revision as of 18:48, 12 May 2022

BiPolytrope with $n_{c} = 5$ and $n_{e} = 1$

This chapter very closely parallels our original analytic derivation — see also, 📚 P. P. Eggleton, J. Faulkner, & R. C. Cannon (1998, MNRAS, Vol. 298, issue 3, pp. 831 - 834) — of the structure of bipolytropes in which the core has an $n_{c} = 5$ polytropic index and the envelope has an $n_{e} = 1$ polytropic index. Our primary objective, here, is to renormalize the principal set of variables, replacing the central density with the configuration's total mass, so that the mass is held fixed along each model sequence.

From Table 1 of our original analytic derivation, we see that,

$(\frac{μ_{e}}{μ_{c}})^{2} M_{t o t}$	$=$	$(\frac{2}{π})^{1 / 2} 𝓂_{s u r f a c e} (\frac{K_{c}}{G})^{3 / 2} ρ_{0}^{- 1 / 5}$
$\Rightarrow ρ_{0}$	$=$	${(\frac{2}{π})^{1 / 2} 𝓂_{s u r f a c e} (\frac{K_{c}}{G})^{3 / 2} (\frac{μ_{e}}{μ_{c}})^{- 2} M_{t o t}^{- 1}}^{5},$

where,

𝓂_{s u r f a c e}

\equiv

θ_{i}^{- 1} (- η^{2} \frac{d ϕ}{d η})_{s} = \frac{A η_{s}}{θ_{i}} .

Steps 2 & 3

Based on the discussion presented elsewhere of the structure of an isolated $n = 5$ polytrope, the core of this bipolytrope will have the following properties:

$θ (ξ) = [1 + \frac{1}{3} ξ^{2}]^{- 1 / 2} \Rightarrow θ_{i} = [1 + \frac{1}{3} ξ_{i}^{2}]^{- 1 / 2};$

$\frac{d θ}{d ξ} = - \frac{ξ}{3} [1 + \frac{1}{3} ξ^{2}]^{- 3 / 2} \Rightarrow (\frac{d θ}{d ξ})_{i} = - \frac{ξ_{i}}{3} [1 + \frac{1}{3} ξ_{i}^{2}]^{- 3 / 2} .$

The first zero of the function $θ (ξ)$ and, hence, the surface of the corresponding isolated $n = 5$ polytrope is located at $ξ_{s} = \infty$ . Hence, the interface between the core and the envelope can be positioned anywhere within the range, $0 < ξ_{i} < \infty$ .

Step 4: Throughout the core ( $0 \leq ξ \leq ξ_{i}$ )

Specify: $K_{c}$ and $ρ_{0} \Rightarrow$
$ρ$	$=$	$ρ_{0} θ^{n_{c}}$	$=$	$ρ_{0} (1 + \frac{1}{3} ξ^{2})^{- 5 / 2}$
$P$	$=$	$K_{c} ρ_{0}^{1 + 1 / n_{c}} θ^{n_{c} + 1}$	$=$	$K_{c} ρ_{0}^{6 / 5} (1 + \frac{1}{3} ξ^{2})^{- 3}$
$r$	$=$	$[\frac{(n_{c} + 1) K_{c}}{4 π G}]^{1 / 2} ρ_{0}^{(1 - n_{c}) / (2 n_{c})} ξ$	$=$	$[\frac{K_{c}}{G ρ_{0}^{4 / 5}}]^{1 / 2} (\frac{3}{2 π})^{1 / 2} ξ$
$M_{r}$	$=$	$4 π [\frac{(n_{c} + 1) K_{c}}{4 π G}]^{3 / 2} ρ_{0}^{(3 - n_{c}) / (2 n_{c})} (- ξ^{2} \frac{d θ}{d ξ})$	$=$	$[\frac{K_{c}^{3}}{G^{3} ρ_{0}^{2 / 5}}]^{1 / 2} (\frac{2 \cdot 3}{π})^{1 / 2} [ξ^{3} (1 + \frac{1}{3} ξ^{2})^{- 3 / 2}]$

@@ Line 3: / Line 3: @@
 This chapter very closely parallels our [[SSC/Structure/BiPolytropes/Analytic51|original analytic derivation]] &#8212; see also, {{ EFC98full }} &#8212; of the structure of bipolytropes in which the core has an <math>n_c=5</math> polytropic index and the envelope has an <math>n_e=1</math> polytropic index.  Our primary objective, here, is to renormalize the principal set of variables, replacing the central density with the configuration's total mass, so that the mass is held fixed along each model ''sequence''.
+From [[SSC/Structure/BiPolytropes/Analytic51#Parameter_Values|Table 1 of our original analytic derivation]], we see that,
+<table border="0" align="center" cellpadding="5">
+<tr>
+  <td align="right"><math>\biggl(\frac{\mu_e}{\mu_c}\biggr)^2 M_\mathrm{tot}</math></td>
+  <td align="center"><math>=</math></td>
+  <td align="left"><math>\biggl(\frac{2}{\pi}\biggr)^{1 / 2} \mathcal{m}_\mathrm{surface}
+\biggl(\frac{K_c}{G}\biggr)^{3 / 2} \rho_0^{-1 / 5}</math></td>
+</tr>
+<tr>
+  <td align="right"><math>\Rightarrow ~~~ \rho_0 </math></td>
+  <td align="center"><math>=</math></td>
+  <td align="left"><math>\biggl\{\biggl(\frac{2}{\pi}\biggr)^{1 / 2} \mathcal{m}_\mathrm{surface}
+\biggl(\frac{K_c}{G}\biggr)^{3 / 2}
+\biggl(\frac{\mu_e}{\mu_c}\biggr)^{-2} M_\mathrm{tot}^{-1}\biggr\}^5
+\, ,</math></td>
+</tr>
+</table>
+where,
+<table border="0" align="center" cellpadding="5">
+<tr>
+  <td align="right"><math>\mathcal{m}_\mathrm{surface}</math></td>
+  <td align="center"><math>\equiv</math></td>
+  <td align="left"><math>\theta_i^{-1}\biggl(-\eta^2 \frac{d\phi}{d\eta}\biggr)_s = \frac{A\eta_s}{\theta_i} \, .</math></td>
+</tr>
+</table>
 ==Steps 2 &amp; 3==
@@ Line 16: / Line 44: @@
 </div>
 The first zero of the function <math>~\theta(\xi)</math> and, hence, the surface of the corresponding isolated <math>~n=5</math> polytrope is located at <math>~\xi_s = \infty</math>.  Hence, the interface between the core and the envelope can be positioned anywhere within the range, <math>~0 < \xi_i < \infty</math>.
+==Step 4:  Throughout the core (<math>0 \le \xi \le \xi_i</math>)==
+<div align="center">
+<table border="0" cellpadding="3">
+<tr>
+  <td align="center" colspan="3">
+Specify:  <math>K_c</math> and <math>\rho_0 ~\Rightarrow</math>
+  </td>
+  <td colspan="2">
+&nbsp;
+  </td>
+</tr>
+<tr>
+  <td align="right">
+<math>\rho</math>
+  </td>
+  <td align="center">
+<math>=</math>
+  </td>
+  <td align="left">
+<math>\rho_0 \theta^{n_c}</math>
+  </td>
+  <td align="center">
+<math>=</math>
+  </td>
+  <td align="left">
+<math>\rho_0 \biggl( 1 + \frac{1}{3}\xi^2 \biggr)^{-5/2}</math>
+  </td>
+</tr>
+<tr>
+  <td align="right">
+<math>P</math>
+  </td>
+  <td align="center">
+<math>=</math>
+  </td>
+  <td align="left">
+<math>K_c \rho_0^{1+1/n_c} \theta^{n_c + 1}</math>
+  </td>
+  <td align="center">
+<math>=</math>
+  </td>
+  <td align="left">
+<math>K_c \rho_0^{6/5} \biggl( 1 + \frac{1}{3}\xi^2 \biggr)^{-3}</math>
+  </td>
+</tr>
+<tr>
+  <td align="right">
+<math>r</math>
+  </td>
+  <td align="center">
+<math>=</math>
+  </td>
+  <td align="left">
+<math>\biggl[ \frac{(n_c + 1)K_c}{4\pi G} \biggr]^{1/2} \rho_0^{(1-n_c)/(2n_c)} \xi</math>
+  </td>
+  <td align="center">
+<math>=</math>
+  </td>
+  <td align="left">
+<math>\biggl[ \frac{K_c}{G\rho_0^{4/5}} \biggr]^{1/2} \biggl(\frac{3}{2\pi}\biggr)^{1/2} \xi</math>
+  </td>
+</tr>
+<tr>
+  <td align="right">
+<math>M_r</math>
+  </td>
+  <td align="center">
+<math>=</math>
+  </td>
+  <td align="left">
+<math>4\pi \biggl[ \frac{(n_c + 1)K_c}{4\pi G} \biggr]^{3/2} \rho_0^{(3-n_c)/(2n_c)} \biggl(-\xi^2 \frac{d\theta}{d\xi} \biggr)</math>
+  </td>
+  <td align="center">
+<math>=</math>
+  </td>
+  <td align="left">
+<math>\biggl[ \frac{K_c^3}{G^3 \rho_0^{2/5} } \biggr]^{1/2} \biggl( \frac{2\cdot 3}{\pi } \biggr)^{1/2} \biggl[ \xi^3 \biggl( 1 + \frac{1}{3}\xi^2 \biggr)^{-3/2} \biggr]</math>
+  </td>
+</tr>
+</table>
+</div>
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SSC/Structure/BiPolytropes/Analytic51Renormalize: Difference between revisions

Revision as of 18:48, 12 May 2022

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BiPolytrope with $n_{c} = 5$ and $n_{e} = 1$

Steps 2 & 3

Step 4: Throughout the core ( $0 \leq ξ \leq ξ_{i}$ )

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SSC/Structure/BiPolytropes/Analytic51Renormalize: Difference between revisions

Revision as of 18:48, 12 May 2022

BiPolytrope with nc=5 and ne=1

Steps 2 & 3

Step 4: Throughout the core (0≤ξ≤ξi)

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BiPolytrope with $n_{c} = 5$ and $n_{e} = 1$

Step 4: Throughout the core ( $0 \leq ξ \leq ξ_{i}$ )