Periodic solutions for critical fractional problems

Abstract

We deal with the existence of 2π-periodic solutions to the following non-local critical problem equation* \arrayll [(-x+m2)s-m2s]u=W(x)|u|2*s-2u+ f(x, u) &in (-π,π)N \\ u(x+2π ei)=u(x) &for all x ∈ RN, i=1, …, N, array . equation* where s∈ (0,1), N ≥ 4s, m≥ 0, 2*s=2NN-2s is the fractional critical Sobolev exponent, W(x) is a positive continuous function, and f(x, u) is a superlinear 2π-periodic (in x) continuous function with subcritical growth. When m>0, the existence of a nonconstant periodic solution is obtained by applying the Linking Theorem, after transforming the above non-local problem into a degenerate elliptic problem in the half-cylinder (-π,π)N× (0, ∞), with a nonlinear Neumann boundary condition, through a suitable variant of the extension method in periodic setting. We also consider the case m=0 by using a careful procedure of limit. As far as we know, all these results are new.