Well-posedness and L1-Lp Smoothing Effect of the Porous Media Equation under Poincaré Inequality

Abstract

We study the Cauchy problem for a weighted porous medium equation on associated with a Gibbs probability measure π=e-V. Under a Poincaré inequality for π and the convexity assumption on V, we prove well-posedness and uniqueness of non-negative weak solutions with initial data in L1(,π). We also establish an L1--Lp smoothing effect at every positive time. More precisely, for every admissible p>1, we show that the logarithm of the ratio between the Lp(,π) norm of the solution and its conserved L1(,π) mass first decays at a super-exponential rate and then decays exponentially to zero. In particular, even if the initial datum belongs only to L1(,π), the solution belongs to Lp(,π) for every finite p>1 and every t>0.