A General Class of Self-similar Self-gravitating Fluids

I present a general classification of self-similar solutions to the equations of gravitational hydrodynamics that contain many previous results as special cases. For cold flows with spherical symmetry, the solution space can be classified into several regions of behavior similar to the Bondi solutions for steady flow. A full description of these solution is possible, which serves as the asymptotic limit for the general problem. By applying a shock jump condition, exact general solutions can be constructed. The isothermal case allows an extra exact integral, and can be asymptotically analyzed in the presence of finite pressure. These solutions serve as analytic models for problems such as spherical accretion for star formation, infall or outflow of gas into galaxies, Lyman alpha cloud dynamics, etc. Most previous self-similar results are obtained as special cases. The critical values for a cosmological flow with Ω = 1 and γ = 4/3 turn out to play a special role. Subject headings: gravitational collapse, hydrodynamics, self-similar, shock waves