Uniform tail estimates and Lp(RN)-convergence for finite-difference approximations of nonlinear diffusion equations

Abstract

We obtain new equitightness and C([0,T];Lp(RN))-convergence results for finite-difference approximations of generalized porous medium equations of the form ∂tu-L[(u)]=g RN×(0,T), where :R is continuous and nondecreasing, and L is a local or nonlocal diffusion operator. Our results include slow diffusions, strongly degenerate Stefan problems, and fast diffusions above a critical exponent. These results improve the previous C([0,T];Llocp(RN))-convergence obtained in a series of papers on the topic by the authors. To have equitightness and global Lp(RN)-convergence, some additional restrictions on L and are needed. Most commonly used symmetric operators L are still included: the Laplacian, fractional Laplacians, and other generators of symmetric L\'evy processes with some fractional moment. We also discuss extensions to nonlinear possibly strongly degenerate convection-diffusion equations.