Existence and Uniqueness of Solutions to a Nonlocal Equation with Monostable Nonlinearity
Abstract
Let J ∈ C(R), J 0, ∫ J = 1 and consider the nonlocal diffusion operator M[u] = J u - u. We study the equation M u + f(x,u) = 0, u 0, in R, where f is a KPP-type nonlinearity, periodic in x. We show that the principal eigenvalue of the linearization around zero is well defined and that a nontrivial solution of the nonlinear problem exists if and only if this eigenvalue is negative. We prove that if, additionally, J is symmetric, then the nontrivial solution is unique.
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