Multiple solutions for superlinear fractional problems via theorems of mixed type

Abstract

In this paper we investigate the existence of multiple solutions for the following two fractional problems equation* \arrayll (-)s u-λ u= f(x, u) &in \\ u=0 &in ∂ array . equation* and equation* \arrayll (-RN)s u-λ u= f(x, u) &in \\ u=0 &in RN , array . equation* where s∈ (0,1), N>2s, is a smooth bounded domain of RN, and f:× R→ R is a superlinear continuous function which does not satisfy the well-known Ambrosetti-Rabinowitz condition. Here (-)s is the spectral Laplacian and (-RN)s is the fractional Laplacian in RN. By applying variational theorems of mixed type due to Marino and Saccon and Linking Theorem, we prove the existence of multiple solutions for the above problems.