On the strong maximum principle for nonlocal operators

Abstract

In this paper we derive a strong maximum principle for weak supersolutions of nonlocal equations of the form Iu=c(x) u in , where ⊂ RN is a domain, c∈ L∞() and I is an operator of the form Iu(x)=P.V.∫RN(u(x)-u(y))j(x-y)\ dy with a nonnegative kernel function j. We formulate minimal positivity assumptions on j corresponding to a class of operators which includes highly anisotropic variants of the fractional Laplacian. Somewhat surprisingly, this problem leads to the study of general lattices in RN. Our results extend to the regional variant of the operator I and, under weak additional assumptions, also to the case of x-dependent kernel functions.