On the solvability of resonance problems for nonlocal elliptic equations

Abstract

In this article, we consider the following problem: \ arraylr (-)s u = α u+ -β u- + f(u) + h \; in\; u =0 \; on\; Rn , array . where ⊂ Rn is a bounded domain with Lipschitz boundary, n> 2s, 0<s<1, (α, β) ∈ R2, f: R R is a bounded and continuous function and h∈ L2(). We prove the existence results in two cases: First, the nonresonance case, where (α,β) is not an element of the Fucik spectrum. Second, the resonance case, where (α,β) is an element of the Fucik spectrum. Our existence results follows as an application of the Saddle point Theorem. It extends some results, well known for Laplace operator, to the nonlocal operator.