Saddle solutions for the fractional Choquard equation

Abstract

We study the saddle solutions for the fractional Choquard equation align* (-)su+ u=(Kα|u|p)|u|p-2u, x∈ RN align* where s∈(0,1), N≥ 3 and Kα is the Riesz potential with order α∈ (0,N). For every Coxeter group G with rank 1≤ k≤ N and p∈[2,N+αN-2s), we construct a G-saddle solution with prescribed symmetric nodal configurations. This is a counterpart for the fractional Choquard equation of saddle solutions to the Choquard equation and further completes the existence of non-radial sign-changing solutions for this doubly nonlocal equation.