SSC/Stability/BiPolytropes/RedGiantToPN/Pt4: Difference between revisions

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\cdot \biggl[\frac{K_5}{G} \cdot \rho_c^{-4/5} \biggr]^{1/2} \biggl(\frac{3}{2\pi}\biggr)^{1 / 2} \xi
\cdot \biggl[\frac{K_5}{G} \cdot \rho_c^{-4/5} \biggr]^{1/2} \biggl(\frac{3}{2\pi}\biggr)^{1 / 2} \xi
~\biggl[K_5\rho_c^{6/5} \theta^{6}  \biggr]^{-1}
~\biggl[K_5\rho_c^{6/5} \theta^{6}  \biggr]^{-1}
</math>
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</tr>
<tr>
  <td align="right">
&nbsp;
  </td>
  <td align="center">
<math>=</math>
  </td>
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<math>
6~\biggl(-~\frac{\xi}{\theta} \frac{d\theta}{d\xi}\biggr) \, .
</math>
</math>
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   </td>

Revision as of 18:41, 24 January 2026

Main Sequence to Red Giant to Planetary Nebula


Part I:  Background & Objective

 


Part II: 

 


Part III: 

 


Part IV: 

 

Succinct

Generic

Adiabatic Wave (or Radial Pulsation) Equation

d2xdr02+[4r0(g0ρ0P0)]dxdr0+(ρ0γgP0)[ω2+(43γg)g0r0]x=0

may also be written as …

0

=

d2xdr*2+{4(ρ*P*)Mr*(r*)}1r*dxdr*+(ρ*P*){2πσc23γg(34γg)Mr*(r*)3}x.

In shorthand, we can rewrite this equation in the form,

0

=

x+r*x+𝒦x,

where,

x

=

dxdr*

      and      

x

=

d2xd(r*)2;

and,

𝒦(ρ*P*)[(σc2γg)2π3(34γg)Mr*(r*)3];

and,

{4(ρ*P*)Mr*(r*)}.

Specific Polytropes

In a separate discussion, we have shown that configurations with a polytropic equation of state exhibit a characteristic length scale that is given by the expression,

an

[(n+1)K4πGρc(1n)/n]1/2;

and, once the dimensionless polytropic temperature, θ(ξ), is known, the radial dependence of key physical variables is given by the expressions,

    

if, as in a separate discussion, n=5 and θ=(1+ξ2/3)1/2

r0

=

anξ,

     r0

=

[K5Gρc4/5]1/2(32π)1/2ξ,

ρ0

=

ρcθn,

     ρ0

=

ρcθ5,

P0

=

Kρ0(n+1)/n=Kρc(n+1)/nθn+1,

     P0

=

K5ρc6/5θ6,

M(r0)

=

4πρcan3(ξ2dθdξ)=ρc(3n)/(2n)[(n+1)3K34πG3]1/2(ξ2dθdξ),

     M(r0)

=

[K53G3ρc2/5]1/2(233π)1/2(ξ2dθdξ),

g0

=

GM(r0)r02=Gr02[4πan3ρc(ξ2dθdξ)],

     g0

=

{[K5Gρc4/5]1/2(32π)1/2ξ}2[6K54πGρc4/5]3/2[4πGρc](ξ2dθdξ)]

 

 

=

(23π23)[64π]3/2[GK5ρc4/5][K5Gρc4/5]3/2[Gρc](dθdξ)]

 

 

=

(233π)1/2[K5Gρc6/5]1/2(dθdξ)].

Combining variable expressions from the above right-hand column, we find that for n=5 polytropes,

g0ρ0r0P0

=

(233π)1/2[K5Gρc6/5]1/2(dθdξ)]ρcθ5[K5Gρc4/5]1/2(32π)1/2ξ[K5ρc6/5θ6]1

 

=

6(ξθdθdξ).

More generally, combining variable expressions from the above left-hand column, we find,

g0ρ0r0P0

=

Gan2ξ2[4πan3ρc(ξ2dθdξ)]ρcθnanξ[Kρc(n+1)/nθn+1]1

 

=

4πGK[ρc11/n](ξdθdξ)θ1an2

 

=

(n+1)(ξθdθdξ);

ρ0r02P0

=

ρcθn(anξ)2[Kρc(n+1)/nθn+1]1

 

=

K1ρc1/nan2ξ2θ

 

=

[(n+1)4πGρc]ξ2θ.

As a result, for polytropes we can write,

0

=

d2xdr02+[4(g0ρ0r0P0)]1r0dxdr0+(ρ0r02γgP0)[ω2+(43γg)g0r0]xr02

 

=

d2xdr02+[4(g0ρ0r0P0)]1r0dxdr0+[ω2γg(ρ0r02P0)(34γg)(g0ρ0r0P0)]xr02

 

=

d2xdr02+[4(n+1)Q]1r0dxdr0+(n+1)[ω2γg[14πGρc]ξ2θ(34γg)Q]xr02.

Finally, multiplying through by an2 — which everywhere converts r0 to ξ — gives, what we will refer to as the,

Polytropic LAWE (linear adiabatic wave equation)

0=d2xdξ2+[4(n+1)Q]1ξdxdξ+(n+1)[(σc26γg)ξ2θαQ]xξ2

where:    Q(ξ)dlnθdlnξ,    σc23ω22πGρc,     and,     α(34γg)

BiPolytrope

Let's stick with the dimensional (r0) version and set ω2=0, in which case the Polytropic LAWE is,

0

=

d2xdr02+[4(n+1)Q]1r0dxdr0[(n+1)αQ]xr02.

Core (n = 5)

For the n=5 core, we know that θ=(1+ξ2/3)1/2. Hence,

dθdξ

=

ξ3(1+ξ23)3/2

Q5dlnθdlnξ=ξθdθdξ

=

[ξ3(1+ξ23)3/2]ξ(1+ξ23)1/2

 

=

[ξ23(1+ξ23)1]

 

=

(ξ23+ξ2).

Now, given that,

a52

=

32π[K5G1ρc4/5],

we can everywhere make the substitution,

ξ2

(r0a5)2=2π3[K51Gρc4/5]r02.

Note, also, that throughout the core, the relevant LAWE is,

0

=

d2xdr02+[46Q5]1r0dxdr0[6αQ5]xr02.


Envelope (n = 1)

For the n=1 envelope, we know from separate work that,

ϕ

=

A[sin(ηB)η]

dϕdη

=

Aη2[ηcos(ηB)sin(ηB)]

Q1dlnϕdlnη=ηϕdϕdη

=

ηA[ηsin(ηB)]Aη2[ηcos(ηB)sin(ηB)]

 

=

[1ηcot(ηB)].

0

=

d2xdr02+[4(n+1)Q1]1r0dxdr0[(n+1)αQ1]xr02.

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