Main Sequence to Red Giant to Planetary Nebula

Following the Lead of Yabushita75

Here in the context of $(n_{c}, n_{e}) = (5, 1)$ bipolytropes, we want to construct mass-versus-central density plots like the one displayed for truncated isothermal spheres in Figure 1 of an accompanying discussion, and as displayed for a $(n_{c}, n_{e}) = (\infty, 3 / 2)$ bipolytrope in Figure 1 (p. 445) of 📚 S. Yabushita (1975, MNRAS, Vol. 172, pp. 441 - 453).

In our accompanying chapter that presents example models of $(n_{c}, n_{e}) = (5, 1)$ bipolytropes, we have adopted the following normalizations:

$ρ^{*}$	$\equiv$	$\frac{ρ}{ρ_{0}}$	;	$r^{*}$	$\equiv$	$\frac{r}{[K_{c}^{1 / 2} / (G^{1 / 2} ρ_{0}^{2 / 5})]}$
$P^{*}$	$\equiv$	$\frac{P}{K_{c} ρ_{0}^{6 / 5}}$	;	$M_{r}^{*}$	$\equiv$	$\frac{M_{r}}{[K_{c}^{3 / 2} / (G^{3 / 2} ρ_{0}^{1 / 5})]}$

Also, from the relevant interface conditions, we find,

$(\frac{K_{e}}{K_{c}})$

$=$

$ρ_{0}^{- 4 / 5} (\frac{μ_{e}}{μ_{c}})^{- 2} θ_{i}^{- 4} .$

Inverting this last expression gives,

$ρ_{0}^{4 / 5}$	$=$	$(\frac{μ_{e}}{μ_{c}})^{- 2} θ_{i}^{- 4} (\frac{K_{e}}{K_{c}})^{- 1}$
$\Rightarrow ρ_{0}^{1 / 5}$	$=$	$(\frac{μ_{e}}{μ_{c}})^{- 1 / 2} θ_{i}^{- 1} (\frac{K_{e}}{K_{c}})^{- 1 / 4} .$

Hence, for a given specification of the interface location, $ξ_{i}$ , the desired expression for the central density is,

$ρ_{0}$

$=$

$[K_{e}^{- 5} K_{c}^{5}]^{1 / 4} (\frac{μ_{e}}{μ_{c}})^{- 5 / 2} θ_{i}^{- 5};$

and, drawing the expression for the normalized total mass from our accompanying table of parameter values, namely,

$M_{t o t}^{*}$

$=$

$(\frac{μ_{e}}{μ_{c}})^{- 2} (\frac{2}{π})^{1 / 2} \frac{A η_{s}}{θ_{i}}$

we find,

$M_{r}$	$=$	$M_{r}^{*} [K_{c}^{3 / 2} G^{- 3 / 2} ρ_{0}^{- 1 / 5}]$
	$=$	$M_{r}^{*} [K_{c}^{3 / 2} G^{- 3 / 2}] {(\frac{μ_{e}}{μ_{c}})^{- 1 / 2} θ_{i}^{- 1} (\frac{K_{e}}{K_{c}})^{- 1 / 4}}^{- 1}$
	$=$	$M_{r}^{*} [K_{c}^{3 / 2} G^{- 3 / 2} (\frac{K_{e}}{K_{c}})^{1 / 4}] (\frac{μ_{e}}{μ_{c}})^{1 / 2} θ_{i}$
$\Rightarrow M_{t o t}$	$=$	$[K_{c}^{3 / 2} G^{- 3 / 2} (\frac{K_{e}}{K_{c}})^{1 / 4}] (\frac{μ_{e}}{μ_{c}})^{1 / 2} θ_{i} (\frac{μ_{e}}{μ_{c}})^{- 2} (\frac{2}{π})^{1 / 2} \frac{A η_{s}}{θ_{i}}$
	$=$	$[K_{e} K_{c}^{- 5} G^{- 6}]^{1 / 4} (\frac{μ_{e}}{μ_{c}})^{- 3 / 2} (\frac{2}{π})^{1 / 2} A η_{s},$

where — again, from our accompanying table of parameter values —