Improved energy methods for nonlocal diffusion problems

Abstract

We prove an energy inequality for nonlocal diffusion operators of the following type, and some of its generalisations: Lu (x) := ∫RN K(x,y) (u(y) - u(x)) dy, where L acts on a real function u defined on RN, and we assume that K(x,y) is uniformly strictly positive in a neighbourhood of x=y. The inequality is a nonlocal analogue of the Nash inequality, and plays a similar role in the study of the asymptotic decay of solutions to the nonlocal diffusion equation ∂t u = L u as the Nash inequality does for the heat equation. The inequality allows us to give a precise decay rate of the Lp norms of u and its derivatives. As compared to existing decay results in the literature, our proof is perhaps simpler and gives new results in some cases (particularly, and surprisingly, in dimensions N = 1, 2).