The problem I have is on finding the particular and general solutions to Einstein Field Equations under generalized Vaidya Geometry, which comes from the following paper : https://journals.aps.org/prd/pdf/10.1103/PhysRevD.90.064034
In particular I am trying to find the:
(a) Particular solution of the resulting equations, and
(b) The General solution of the resulting equations.
Currently I am trying to solve for $m$ , $\psi_{v}$ and $\psi_{r}$. in the following 2 equations.
\begin{equation} \frac{2\dot{m}(v,r)}{r^{2}}= \Psi^{2}_{v}+ \left(1-\frac{2m(v,r)}{r}\right)\Psi_{v}\Psi_{r}. \end{equation}
\begin{equation} \frac{m^{\prime\prime}(v,r)}{r}= \Psi_{v}\Psi_{r} - \frac{2m^{'}(v,r)}{r^{2}} \end{equation} Any help, or suggestions would be greatly appreciated.
