Rethink Handling of n = 1 Envelope

Solution Steps

Drawing from an accompanying discussion …

Step 1: Choose $n_{c}$ and $n_{e}$ .
Step 2: Adopt boundary conditions at the center of the core ( $θ = 1$ and $d θ / d ξ = 0$ at $ξ = 0$ ), then solve the Lane-Emden equation to obtain the solution, $θ (ξ)$ , and its first derivative, $d θ / d ξ$ throughout the core; the radial location, $ξ = ξ_{s}$ , at which $θ (ξ)$ first goes to zero identifies the natural surface of an isolated polytrope that has a polytropic index $n_{c}$ .
Step 3 Choose the desired location, $0 < ξ_{i} < ξ_{s}$ , of the outer edge of the core.
Step 4: Specify $K_{c}$ and $ρ_{0}$ ; the structural profile of, for example, $ρ (r)$ , $P (r)$ , and $M_{r} (r)$ is then obtained throughout the core — over the radial range, $0 \leq ξ \leq ξ_{i}$ and $0 \leq r \leq r_{i}$ — via the relations shown in the $2^{n d}$ column of Table 1.
Step 5: Specify the ratio μe/μc and adopt the boundary condition, ϕi=1; then use the interface conditions as rearranged and presented in Table 3 to determine, respectively:
- The gas density at the base of the envelope, $ρ_{e}$ ;
- The polytropic constant of the envelope, $K_{e}$ , relative to the polytropic constant of the core, $K_{c}$ ;
- The ratio of the two dimensionless radial parameters at the interface, $η_{i} / ξ_{i}$ ;
- The radial derivative of the envelope solution at the interface, $(d ϕ / d η)_{i}$ .
Step 6: The last sub-step of solution step 5 provides the boundary condition that is needed — in addition to our earlier specification that $ϕ_{i} = 1$ — to derive the desired particular solution, $ϕ (η)$ , of the Lane-Emden equation that is relevant throughout the envelope; knowing $ϕ (η)$ also provides the relevant structural first derivative, $d ϕ / d η$ , throughout the envelope.
Step 7: The surface of the bipolytrope will be located at the radial location, $η = η_{s}$ and $r = R$ , at which $ϕ (η)$ first drops to zero.
Step 8: The structural profile of, for example, $ρ (r)$ , $P (r)$ , and $M_{r} (r)$ is then obtained throughout the envelope — over the radial range, $η_{i} \leq η \leq η_{s}$ and $r_{i} \leq r \leq R$ — via the relations provided in the $3^{r d}$ column of Table 1.

Setup

Drawing from the accompanying Table 1, we have …

Core

Envelope

$n = n_{c}$

$n = n_{e}$

$\frac{1}{ξ^{2}} \frac{d}{d ξ} (ξ^{2} \frac{d θ}{d ξ}) = - θ^{n_{c}}$

sol'n: $θ (ξ)$

$\frac{1}{η^{2}} \frac{d}{d η} (η^{2} \frac{d ϕ}{d η}) = - ϕ^{n_{e}}$

sol'n: $ϕ (η)$

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

Knowing: $K_{e}$ and $ρ_{e} \Rightarrow$
$ρ$	$=$	$ρ_{e} ϕ^{n_{e}}$
$P$	$=$	$K_{e} ρ_{e}^{1 + 1 / n_{e}} ϕ^{n_{e} + 1}$
$r$	$=$	$[\frac{(n_{e} + 1) K_{e}}{4 π G}]^{1 / 2} ρ_{e}^{(1 - n_{e}) / (2 n_{e})} η$
$M_{r}$	$=$	$4 π [\frac{(n_{e} + 1) K_{e}}{4 π G}]^{3 / 2} ρ_{e}^{(3 - n_{e}) / (2 n_{e})} (- η^{2} \frac{d ϕ}{d η})$

Appendix/Ramblings/51BiPolytropeStability/RethinkEnvelope

Contents

Rethink Handling of n = 1 Envelope

Solution Steps

Setup

See Also

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Appendix/Ramblings/51BiPolytropeStability/RethinkEnvelope

Rethink Handling of n = 1 Envelope

Solution Steps

Setup

See Also

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