The stochastic porous media equation in d

Abstract

Existence and uniqueness of solutions to the stochastic porous media equation dX-(X) dt=XdW in d are studied. Here, W is a Wiener process, is a maximal monotone graph in × such that (r) C|r|m, r∈, W is a coloured Wiener process. In this general case the dimension is restricted to d 3, the main reason being the absence of a convenient multiplier result in the space =\∈S'(d);\ ||()()∈ L2(d)\, for d2. When is Lipschitz, the well-posedness, however, holds for all dimensions on the classical Sobolev space H-1(d). If (r)r|r|m+1 and m=d-2d+2, we prove the finite time extinction with strictly positive probability.