Choquard equations under confining external potentials

Abstract

We consider the nonlinear Choquard equation - u+V u=(Iα u p) u p-2u in RN where N≥ 1, Iα is the Riesz potential integral operator of order α ∈ (0, N) and p > 1. If the potential V ∈ C (RN; [0,+∞)) satisfies the confining condition x +∞V(x)1+ x N+αp-N=+∞, and 1p > N - 2N + α, we show the existence of a groundstate, of an infinite sequence of solutions of unbounded energy and, when p 2 the existence of least energy nodal solution. The constructions are based on suitable weighted compact embedding theorems. The growth assumption is sharp in view of a Pohozaev identity that we establish.