Revision as of 16:56, 10 November 2023

Stability of a BiPolytrope with an Isothermal Core

This analysis pulls largely from 📚 S. Yabushita (1975, MNRAS, Vol. 172, pp. 441 - 453); the focus is on bipolytropes having $(n_{c}, n_{e}) = (\infty, \frac{3}{2})$ . In an accompanying discussion, we summarize the steps that Yabushita took — from 1968 and 1974, to 1975 — that led up to his discovery of an analytic description of the isothermal displacement function.

Equilibrium Structure

We will follow the accompanying formal recipe for building a bipolytropic model, using the step-by-step construction of Milne's (1930) configurations as a guide.

Step 1

The 📚 Yabushita (1975) bipolytrope has an isothermal core $(n_{c} = \infty)$ and an $n_{e} = \frac{3}{2}$ polytropic envelope.

Steps 2 & 3

Throughout the core, the properties of this bipolytrope can be expressed in terms of the Lane-Emden function, $ψ (χ)$ , which derives from a solution of the 2^nd-order ODE,

Isothermal Lane-Emden Equation

$\frac{1}{ξ^{2}} \frac{d}{d ξ} (ξ^{2} \frac{d ψ}{d ξ}) = e^{- ψ}$

subject to the boundary conditions,

$ψ = 1$ and $\frac{d ψ}{d ξ} = 0$ at $ξ = 0$ .

As has been demonstrated in our accompanying mathematics appendix, a series expansion about the center of the isothermal configuration gives,

$ψ (ξ)$

$=$

$\frac{ξ^{2}}{6} - \frac{ξ^{4}}{120} + \frac{ξ^{6}}{1890} - \frac{61 ξ^{8}}{1, 632, 960} + \dots .$

The solution, $ψ (ξ)$ , extends to infinity, so the interface between the core and the envelope can be positioned anywhere within the range, $0 < ξ_{i} < \infty$ .

Step4: Throughout the core

Specify: $c_{s}^{2}$ and $ρ_{0} \Rightarrow$
$r$	$=$	$[\frac{c_{s}^{2}}{4 π G ρ_{0}}]^{1 / 2} ξ$	(2.2)
$ρ$	$=$	$ρ_{0} e^{- ψ}$	(2.2)
$P$	$=$	$c_{s}^{2} ρ_{0} e^{- ψ}$	(2.1)
$M_{r}$	$=$	$[\frac{c_{s}^{6}}{4 π G^{3} ρ_{0}}]^{1 / 2} (ξ^{2} \frac{d ψ}{d ξ})$	(2.3)
📚 Yabushita (1975), § 2, pp. 442-443

After adopting the substitute notation, $c_{s}^{2} \to K_{1}$ and $ρ_{0} \to λ_{c}$ , it is clear that these last four parameter-profile expressions are identical to the ones that appear, respectively, as equations (2.2), (2.1) and (2.3) of 📚 Yabushita (1975).

Step 5: Interface Conditions

$(\frac{ρ_{0}}{μ_{c}}) e^{- ψ_{i}}$	$=$	$(\frac{ρ_{e}}{μ_{e}}) θ_{i}^{n_{e}}$	$=$	$(\frac{ρ_{e}}{μ_{e}}) θ_{i}^{3 / 2}$
$c_{s}^{2} ρ_{0} e^{- ψ_{i}}$	$=$	$K_{e} ρ_{e}^{1 + 1 / n_{e}} θ_{i}^{n_{e} + 1}$	$=$	$K_{e} ρ_{e}^{5 / 3} θ_{i}^{5 / 2}$
$[\frac{c_{s}^{2}}{4 π G ρ_{0}}]^{1 / 2} ξ_{i}$	$=$	$[\frac{(n_{e} + 1) K_{e}}{4 π G}]^{1 / 2} ρ_{e}^{(1 - n_{e}) / (2 n_{e})} η_{i}$	$=$	$[\frac{(5 / 2) K_{e}}{4 π G}]^{1 / 2} ρ_{e}^{(- 1 / 6)} η_{i}$
$[\frac{c_{s}^{6}}{4 π G^{3} ρ_{0}}]^{1 / 2} (ξ^{2} \frac{d ψ}{d ξ})_{i}$	$=$	$4 π [\frac{(n_{e} + 1) K_{e}}{4 π G}]^{3 / 2} ρ_{e}^{(3 - n_{e}) / (2 n_{e})} (- η^{2} \frac{d θ}{d η})_{i}$	$=$	$4 π [\frac{(5 / 2) K_{e}}{4 π G}]^{3 / 2} ρ_{e}^{1 / 2} (- η^{2} \frac{d θ}{d η})_{i}$

This means that,

$\frac{ρ_{e}}{ρ_{0}}$	$=$	$(\frac{μ_{e}}{μ_{c}}) e^{- ψ_{i}} θ_{i}^{- 3 / 2};$
$K_{e} [ρ_{0} (\frac{μ_{e}}{μ_{c}}) e^{- ψ_{i}} θ_{i}^{- 3 / 2}]^{5 / 3} θ_{i}^{5 / 2}$	$=$	$c_{s}^{2} ρ_{0} e^{- ψ_{i}}$
$\Rightarrow \frac{K_{e} ρ_{0}^{2 / 3}}{c_{s}^{2}}$	$=$	$(\frac{μ_{e}}{μ_{c}})^{- 5 / 3} e^{+ 2 ψ_{i} / 3}$
$\Rightarrow \frac{c_{s}^{2}}{K_{e}}$	$=$	$[(\frac{μ_{e}}{μ_{c}})^{5 / 2} ρ_{0} e^{- ψ_{i}}]^{2 / 3};$
$\frac{η_{i}}{ξ_{i}}$	$=$	$[\frac{c_{s}^{2}}{4 π G ρ_{0}}]^{1 / 2} [\frac{4 π G}{(5 / 2) K_{e}}]^{1 / 2} [ρ_{e}]^{1 / 6}$
	$=$	$(\frac{2}{5})^{1 / 2} [\frac{c_{s}^{2}}{K_{e}}]^{1 / 2} [ρ_{0} (\frac{μ_{e}}{μ_{c}}) e^{- ψ_{i}} θ_{i}^{- 3 / 2}]^{1 / 6} ρ_{0}^{- 1 / 2}$
	$=$	$(\frac{2}{5})^{1 / 2} [(\frac{μ_{e}}{μ_{c}})^{5 / 2} ρ_{0} e^{- ψ_{i}}]^{1 / 3} [(\frac{μ_{e}}{μ_{c}})^{1 / 6} e^{- ψ_{i} / 6} θ_{i}^{- 1 / 4}] ρ_{0}^{- 1 / 3}$
	$=$	$(\frac{2}{5})^{1 / 2} (\frac{μ_{e}}{μ_{c}}) e^{- ψ_{i} / 2} θ_{i}^{- 1 / 4} .$

And, finally,

$(- η^{2} \frac{d θ}{d η})_{i}$	$=$	$\frac{1}{4 π} [\frac{c_{s}^{6}}{4 π G^{3} ρ_{0}}]^{1 / 2} [\frac{4 π G}{(5 / 2) K_{e}}]^{3 / 2} [ρ_{e}]^{- 1 / 2} (ξ^{2} \frac{d ψ}{d ξ})_{i}$
	$=$	$(\frac{2}{5})^{3 / 2} ρ_{0}^{- 1 / 2} [\frac{c_{s}^{2}}{K_{e}}]^{3 / 2} [ρ_{0} (\frac{μ_{e}}{μ_{c}}) e^{- ψ_{i}} θ_{i}^{- 3 / 2}]^{- 1 / 2} (ξ^{2} \frac{d ψ}{d ξ})_{i}$
	$=$	$(\frac{2}{5})^{3 / 2} ρ_{0}^{- 1} [(\frac{μ_{e}}{μ_{c}})^{5 / 2} ρ_{0} e^{- ψ_{i}}] [(\frac{μ_{e}}{μ_{c}}) e^{- ψ_{i}} θ_{i}^{- 3 / 2}]^{- 1 / 2} (ξ^{2} \frac{d ψ}{d ξ})_{i}$
	$=$	$(\frac{2}{5})^{3 / 2} (\frac{μ_{e}}{μ_{c}})^{2} e^{- ψ_{i} / 2} θ_{i}^{3 / 4} (ξ^{2} \frac{d ψ}{d ξ})_{i}$
$\Rightarrow (- \frac{d θ}{d η})_{i}$	$=$	$(\frac{2}{5})^{3 / 2} (\frac{μ_{e}}{μ_{c}})^{2} e^{- ψ_{i} / 2} θ_{i}^{3 / 4} (\frac{d ψ}{d ξ})_{i} [(\frac{2}{5})^{1 / 2} (\frac{μ_{e}}{μ_{c}}) e^{- ψ_{i} / 2} θ_{i}^{- 1 / 4}]^{- 2}$
	$=$	$(\frac{2}{5})^{1 / 2} e^{+ ψ_{i} / 2} θ_{i}^{5 / 4} (\frac{d ψ}{d ξ})_{i} .$

Summary Interface Relations

Our Derivations

After setting

ρ_{e} = ρ_{0}

Presented by 📚 Yabushita (1975)
(after setting

μ_{e} / μ_{c} = 1

)

$\frac{ρ_{e}}{ρ_{0}}$	$=$	$(\frac{μ_{e}}{μ_{c}}) e^{- ψ_{i}} θ_{i}^{- 3 / 2};$
$\frac{c_{s}^{2}}{K_{e}}$	$=$	$[(\frac{μ_{e}}{μ_{c}})^{5 / 2} ρ_{0} e^{- ψ_{i}}]^{2 / 3};$
$\frac{η_{i}}{ξ_{i}}$	$=$	$(\frac{2}{5})^{1 / 2} (\frac{μ_{e}}{μ_{c}}) e^{- ψ_{i} / 2} θ_{i}^{- 1 / 4};$
$(- \frac{d θ}{d η})_{i}$	$=$	$(\frac{2}{5})^{1 / 2} e^{+ ψ_{i} / 2} θ_{i}^{5 / 4} (\frac{d ψ}{d ξ})_{i} .$

$θ_{i}^{3 / 2}$	$=$	$(\frac{μ_{e}}{μ_{c}}) e^{- ψ_{i}};$
$[\frac{c_{s}^{2}}{K_{e}}]^{3}$	$=$	$(\frac{μ_{e}}{μ_{c}})^{5} [ρ_{0} e^{- ψ_{i}}]^{2};$
$\frac{η_{i}}{ξ_{i}}$	$=$	$(\frac{2}{5})^{1 / 2} (\frac{μ_{e}}{μ_{c}}) e^{- ψ_{i} / 2} [(\frac{μ_{e}}{μ_{c}}) e^{- ψ_{i}}]^{- 1 / 6} = (\frac{2}{5})^{1 / 2} (\frac{μ_{e}}{μ_{c}})^{5 / 6} e^{- ψ_{i} / 3};$
$(- \frac{d θ}{d η})_{i}$	$=$	$(\frac{2}{5})^{1 / 2} (\frac{d ψ}{d ξ})_{i} e^{+ ψ_{i} / 2} [(\frac{μ_{e}}{μ_{c}}) e^{- ψ_{i}}]^{5 / 6} = (\frac{2}{5})^{1 / 2} (\frac{d ψ}{d ξ})_{i} e^{- ψ_{i} / 3} (\frac{μ_{e}}{μ_{c}})^{5 / 6} .$

$θ_{i}^{3 / 2}$	$=$	$e^{- ψ_{i}};$	(2.9)
$[\frac{c_{s}^{2}}{K_{e}}]^{3 / 2}$	$=$	$λ_{c} e^{- ψ_{i}};$	(2.11)
$\frac{η_{i}}{ξ_{i}}$	$=$	$(\frac{2}{5})^{1 / 2} e^{- ψ_{i} / 3};$	(2.12)
$(\frac{d θ}{d η})_{i}$	$=$	$- (\frac{2}{5})^{1 / 2} (\frac{d ψ}{d ξ})_{i} e^{- ψ_{i} / 3} .$	(2.13)

Step 8: Throughout the Envelope

Throughout the envelope, we seek the solution, $θ (η)$ , of the following Lane-Emden equation:

$\frac{1}{η^{2}} \frac{d}{d η} (η^{2} \frac{d θ}{d η}) = - θ^{3 / 2} .$

For the envelope, the associated key parameter relations are:

$ρ$	$=$	$ρ_{e} θ^{3 / 2}$
$P$	$=$	$K_{e} ρ_{e}^{5 / 3} θ^{5 / 2}$
$r$	$=$	$[\frac{(5 / 2) K_{e}}{4 π G}]^{1 / 2} ρ_{e}^{- 1 / 6} η$
$M_{r}$	$=$	$4 π [\frac{(5 / 2) K_{e}}{4 π G}]^{3 / 2} ρ_{e}^{1 / 2} (- η^{2} \frac{d θ}{d η})$

@@ Line 24: / Line 24: @@
 &nbsp; &nbsp; &nbsp; at &nbsp; &nbsp; &nbsp; <math>\xi = 0</math>.
 </div>
+As has been demonstrated in [[Appendix/Ramblings/PowerSeriesExpressions#IsothermalLaneEmden|our accompanying ''mathematics'' appendix]], a series expansion about the center of the isothermal configuration gives,
+<table border="0" cellpadding="5" align="center">
+<tr>
+  <td align="right">
+<math>\psi(\xi)
+</math>
+  </td>
+  <td align="center">
+<math>=</math>
+  </td>
+  <td align="left">
+<math>~\frac{\xi^2}{6} - \frac{\xi^4}{120} + \frac{\xi^6}{1890} - \frac{61 \xi^8}{1,632,960} + \cdots \, .</math>
+  </td>
+</tr>
+</table>
 The solution, <math>\psi(\xi)</math>, extends to infinity, so the interface between the core and the envelope can be positioned anywhere within the range, <math>0 < \xi_i < \infty</math>.

SSC/Stability/Yabushita75: Difference between revisions

Revision as of 16:56, 10 November 2023

Contents

Stability of a BiPolytrope with an Isothermal Core

Equilibrium Structure

Step 1

Steps 2 & 3

Step4: Throughout the core

Step 5: Interface Conditions

Step 8: Throughout the Envelope

See Also

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SSC/Stability/Yabushita75: Difference between revisions

Revision as of 16:56, 10 November 2023

Stability of a BiPolytrope with an Isothermal Core

Equilibrium Structure

Step 1

Steps 2 & 3

Step4: Throughout the core

Step 5: Interface Conditions

Step 8: Throughout the Envelope

See Also

Navigation menu

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