On a simple criterion for the existence of a principal eigenfunction of some nonlocal operators

Abstract

In this paper we are interested in the existence of a principal eigenfunction of a nonlocal operator which appears in the description of various phenomena ranging from population dynamics to micro-magnetism. More precisely, we study the following eigenvalue problem: ∫J(x-yg(y))φ(y)gn(y)\, dy +a(x)φ = φ, where ⊂n is an open connected set, J a nonnegative kernel and g a positive function. First, we establish a criterion for the existence of a principal eigenpair (λp,φp). We also explore the relation between the sign of the largest element of the spectrum with a strong maximum property satisfied by the operator. As an application of these results we construct and characterize the solutions of some nonlinear nonlocal reaction diffusion equations.