On the parabolic Harnack inequality for non-local diffusion equations

Abstract

We settle the open question concerning the Harnack inequality for globally positive solutions to non-local in time diffusion equations by constructing a counter-example for dimensions dβ, where β∈(0,2] is the order of the equation with respect to the spatial variable. The equation can be non-local both in time and in space but for the counter-example it is important that the equation has a fractional time derivative. In this case, the fundamental solution is singular at the origin for all times t>0 in dimensions dβ. This underlines the markedly different behavior of time-fractional diffusion compared to the purely space-fractional case, where a local Harnack inequality is known. The key observation is that the memory strongly affects the estimates. In particular, if the initial data u0 ∈ Lqloc for q larger than the critical value dβ of the elliptic operator (-)β/2, a non-local version of the Harnack inequality is still valid as we show. We also observe the critical dimension phenomenon already known from other contexts: the diffusion behavior is substantially different in higher dimensions than d=1 provided β>1, since we prove that the local Harnack inequality holds if d<β.