A Sobolev-Hardy Inequality with¶Applications to a Nonlinear Elliptic Equation¶arising in Astrophysics

In this paper we analyze the existence and non-existence of cylindrical solutions for a nonlinear elliptic equation in ?³, which has been proposed as a model for the dynamics of galaxies. We prove a general integral inequality of Sobolev-Hardy type that allows us to use variational methods when the power p belongs to the interval [4, 6]. We find solutions in the range 4 < p≤ 6. The value p= 4 seems to have characteristics similar to those of the critical Sobolev exponent p= 6.