More Focused Search for Analytic EigenVector of (5,1) Bipolytropes

The ideas that are captured in this chapter have arisen after a review of a previous hunt for the desired analytic eigenvector and as an extension of our accompanying "renormalization" of the Analytic51 bipolytrope.

Review of Attempt 4B

Structure

From a separate search that we labeled Attempt 4B, we draw the following information regarding the structure of the envelope.

$ϕ$

$=$

$a_{0} [\frac{\sin (η - b_{0})}{η}],$

and,

$\frac{d ϕ}{d η}$

$=$

$\frac{a_{0}}{η^{2}} [η \cos (η - b_{0}) - \sin (η - b_{0})],$

and,

$\frac{d^{2} ϕ}{d η^{2}}$

$=$

$- \frac{a_{0}}{η} \cdot \sin (η - b_{0}) - \frac{2 a_{0}}{η^{2}} \cdot \cos (η - b_{0}) + \frac{2 a_{0}}{η^{3}} \cdot \sin (η - b_{0}) .$

This satisfies the Lane-Emden equation for any values of the parameter pair, $a_{0}$ and $b_{0}$ . Note that,

$Q \equiv - \frac{d \ln ϕ}{d \ln η}$	$=$	$[1 - η \cot (η - b_{0})]$
$\Rightarrow η \cot (η - b_{0})$	$=$	$(1 - Q) .$

LAWE

Now, guided by a separate parallel discussion we also showed in Attempt 4B that, in the case of a bipolytropic configuration for which $n_{e} = 1$ , the

Trial Displacement Function
$σ_{c}^{2} = 0$	and	$x_{P}$	$\equiv \frac{3 c_{0} (n - 1)}{2 n} [1 + (\frac{n - 3}{n - 1}) (\frac{1}{η ϕ^{n}}) \frac{d ϕ}{d η}]$
			$= - (\frac{3 c_{0}}{η ϕ}) \frac{d ϕ}{d η} = \frac{3 c_{0}}{η^{2}} \cdot Q,$

precisely satisfies the

Governing LAWE
$0$	$=$	$\frac{d^{2} x_{P}}{d η^{2}} + [4 - 2 Q] \frac{1}{η} \cdot \frac{d x_{P}}{d η} - 2 Q \cdot \frac{x_{P}}{η^{2}} .$

Note for later use that,

$\frac{d \ln x_{P}}{d \ln η} = \frac{η}{x_{P}} \cdot \frac{d}{d η} [\frac{3 c_{0}}{η^{2}} \cdot Q]$	$=$	$3 c_{0} η [\frac{η^{2}}{3 c_{0} \cdot Q}] \cdot \frac{d}{d η} [\frac{Q}{η^{2}}]$
	$=$	$[\frac{η^{3}}{Q}] \cdot [\frac{1}{η^{2}} \frac{d Q}{d η} - \frac{2 Q}{η^{3}}]$
	$=$	$[\frac{d \ln Q}{d \ln η} - 2] .$

Note as well that,

$Q$	$=$	$[1 - \frac{η \cdot \cos (η - b_{0})}{\sin (η - b_{0})}]$
$\Rightarrow \frac{d Q}{d η}$	$=$	$- [\frac{\cos (η - b_{0})}{\sin (η - b_{0})}] + [\frac{η \cdot \sin (η - b_{0})}{\sin (η - b_{0})}] + [\frac{η \cdot \cos^{2} (η - b_{0})}{\sin^{2} (η - b_{0})}]$
	$=$	$η + η \cot^{2} (η - b_{0}) - \cot (η - b_{0})$
$\Rightarrow \frac{d \ln Q}{d \ln η}$	$=$	$Q^{- 1} [η^{2} + η^{2} \cot^{2} (η - b_{0}) - η \cot (η - b_{0})]$
	$=$	$Q^{- 1} [η^{2} + (1 - Q)^{2} + Q - 1] .$

While it is rather amazing that we have been able to identify this analytic solution to the LAWE, the solution seems troubling because it blows up at the surface, where, $η_{s} - b_{0} = π$ . We will ignore this undesired behavior for the time being.

Transition at Interface

Under "Attempt 1" of our accompanying discussion, we have shown that, at the core/envelope interface (note the following mappings: $b \to 3 c_{0}$ and $B \to b_{0}$ ),

$η_{i} \cot (η_{i} - b_{0})$	$=$	$1 - (\frac{μ_{e}}{μ_{c}}) [\frac{3 ξ_{i}^{2}}{3 + ξ_{i}^{2}}]$
$\Rightarrow Q_{i}$	$=$	$(\frac{μ_{e}}{μ_{c}}) [\frac{3 ξ_{i}^{2}}{3 + ξ_{i}^{2}}];$

and,

$3 c_{0}$	$=$	$x_{i} η_{i}^{2} [1 - η_{i} \cot (η_{i} - b_{0})]^{- 1}$
	$=$	$\frac{3}{5} (\frac{μ_{e}}{μ_{c}}) [\frac{15 - ξ_{i}^{2}}{3 + ξ_{i}^{2}}] .$

Appendix/Ramblings/51AnalyticStabilitySynopsis

Contents

More Focused Search for Analytic EigenVector of (5,1) Bipolytropes

Review of Attempt 4B

Structure

LAWE

Transition at Interface

See Also

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