7.1.5 Astrophysical Fluid Dynamics Equations
Thus, by (7.1.4) and (7.1.19) we getRμ νas
(7.1.20)
R 00 =eu−v[
−
1
2
u′′−1
r
u′+1
r
u′(v′−u′)]
,
R 11 =
1
2
u′′−1
r
v′−1
4
u′(v′−u′),R 22 =e−v[
1 −ev+r
2(u′−v′)]
,
R 33 =R 22 sin^2 θ,
Rμ ν= 0 ∀μ 6 =ν.
Therefore, the vacuum Einstein field equations (7.1.17) become the following system of
ordinary differential equations
1
2u′′+1
ru′−1
4
(7.1.21) (v′−u′)u′= 0 ,
1
2u′′−1
rv′−1
4
(7.1.22) (v′−u′)u′= 0 ,
r
2(7.1.23) (u′−v′)−ev+ 1 = 0.
By the Bianchi identity, only two equations of (7.1.22)-(7.1.23) are independent. The
difference of (7.1.21) and (7.1.22) leads to
u′+v′= 0 ,which implies that
(7.1.24) u+v=β (constant),
and (7.1.23) becomes
ev+rv′− 1 = 0.
Namely
d
dr
(re−v) = 1.It follows that
e−v= 1 −b
r,
wherebis a to-be-determined constant.
Then it follows from (7.1.24) that
eu=eβe−v=eβ( 1 −b
r).
By scaling timet, we can takeeβ=1. Hence the solution of the Einstein field equations
(7.1.17) is given by
(7.1.25)
g 00 =−eu=−(
1 −
b
r)
,
g 11 =ev=(
1 −
b
r