On The Fucik Spectrum Of Non-Local Elliptic Operators

Abstract

In this article, we study the Fucik spectrum of fractional Laplace operator which is defined as the set of all (,)∈ R2 such that equation* . arraylr (-)s u = u+ - u- \; in\; u = 0 \; in\; Rn .\\ array \ equation* has a non-trivial solution u, where is a bounded domain in Rn with Lipschitz boundary, n>2s, s∈(0,1). The existence of a first nontrivial curve C of this spectrum, some properties of this curve C, e.g. Lipschitz continuous, strictly decreasing and asymptotic behavior are studied in this article. A variational characterization of second eigenvalue of the fractional eigenvalue problem is also obtained. At the end, we study a nonresonance problem with respect to Fucik spectrum.