Mountain pass solutions for the fractional Berestycki-Lions problem

Abstract

We investigate the existence of least energy solutions and infinitely many solutions for the following nonlinear fractional equation (-)s u = g(u) in RN, where s∈ (0,1), N≥ 2, (-)s is the fractional Laplacian and g: R → R is an odd C1, α function satisfying Berestycki-Lions type assumptions. The proof is based on the symmetric mountain pass approach developed by Hirata, Ikoma and Tanaka in HIT. Moreover, by combining the mountain pass approach and an approximation argument, we also prove the existence of a positive radially symmetric solution for the above problem when g satisfies suitable growth conditions which make our problem fall in the so called "zero mass" case.