Porous media equations with two weights: smoothing and decay properties of energy solutions via Poincar\'e inequalities

Abstract

We study weighted porous media equations on domains ⊂eq RN, either with Dirichlet or with Neumann homogeneous boundary conditions when = RN. Existence of weak solutions and uniqueness in a suitable class is studied in detail. Moreover, Lq0-L smoothing effects (1≤ q0<<∞) are discussed for short time, in connection with the validity of a Poincar\'e inequality in appropriate weighted Sobolev spaces, and the long-time asymptotic behaviour is also studied. Particular emphasis is given to the Neumann problem, which is much less studied in the literature, as well as to the case = RN when the corresponding weight makes its measure finite, so that solutions converge to their weighted average instead than to zero. Examples are given in terms of wide classes of weights.