408 CHAPTER 7. ASTROPHYSICS AND COSMOLOGY
ρ= mass + electromagnetism + potential + heat.5.Equation of state:(7.1.68) p=f(ρ,T).
Remark 7.5.Both physical laws (7.1.63) and (7.1.67) are the more general form than the
classical ones:
(7.1.69)
mdv
dτ=Force the Newton Second Law,
∂m
∂ τ+div(mv) =0 the continuity equation,wheremis the mass density. Hence the momentum representation equations (7.1.65)-(7.1.67)
can be applicable in general. The momentumPrepresents the energy density flux, consisting
essentially of
P=mv+radiation flux+heat flux.
Hence in astrophysics, the momentum densityPis a better candidate than the velocity field
v, to serve as the continuous-media type of state function.
7.1.5 Astrophysical Fluid Dynamics Equations
Dynamic equations of stellar atmosphere
Different from planets, stars are fluid spheres. Like the Sun, most of stars possess at-
mospheric layers. The atmospheric dynamics of stars is an important topic, and we are now
ready to present the stellar atmospheric model.
The spatial domain is a spherical shell:
M={x∈R^3 |r 0 <r<r 1 }.The stellar atmosphere consists of rarefied gas. For example, the solar corona has mass
density aboutρm= 10 −^9 ρ 0 whereρ 0 is the density of the earth atmosphere. Hence we use
the Schwarzschild solution in (7.1.44) as the metric:
(7.1.70) α(r) =
(
1 −
2 mG
c^2 r)− 1
, r 0 >2 mG
c^2.
wheremis the total mass of the star, and the conditionr 0 > 2 mG/c^2 ensures that the star is
not a black hole.
The stellar atmospheric model is the momentum form of the astrophysical fluid dynamical
equations defined on the spherical shellM:
(7.1.71)
∂P
∂ τ+
1
ρ(P·∇)P=ν∆P+μ∇(divP)−∇p−
mGρ
r^2( 1 −βT)~k,∂T
∂ τ+
1
ρ
(P·∇)T=κ∆ ̃T,∂ ρ
∂ τ+divP= 0 ,