Periodic solutions for a superlinear fractional problem without the Ambrosetti-Rabinowitz condition

Abstract

The purpose of this paper is to study T-periodic solutions to [(-x+m2)s-m2s]u=f(x,u) &in (0,T)N (P) u(x+Tei)=u(x) &for all x ∈ N, i=1, …, N where s∈ (0,1), N>2s, T>0, m> 0 and f(x,u) is a continuous function, T-periodic in x and satisfying a suitable growth assumption weaker than the Ambrosetti-Rabinowitz condition. The nonlocal operator (-x+m2)s can be realized as the Dirichlet to Neumann map for a degenerate elliptic problem posed on the half-cylinder ST=(0,T)N× (0,∞). By using a variant of the Linking Theorem, we show that the extended problem in ST admits a nontrivial solution v(x,) which is T-periodic in x. Moreover, by a procedure of limit as m→ 0, we also prove the existence of a nontrivial solution to (P) with m=0.