Semi-classical states for the Choquard equation

Abstract

We study the nonlocal equation -2 u + V u = -α (Iα up) u p - 2 u \(RN\), where N 1, α ∈ (0, N), Iα (x) = Aα/ x N - α is the Riesz potential and > 0 is a small parameter. We show that if the external potential V ∈ C (RN; [0, ∞)) has a local minimum and p ∈ [2, (N + α)/(N - 2)+) then for all small > 0 the problem has a family of solutions concentrating to the local minimum of V provided that: either p > 1 + (α, α + 22)/(N - 2)+, or p > 2 and x ∞ V (x) x 2 > 0, or p = 2 and ∈fx ∈ RN V (x) (1 + x N - α) > 0. Our assumptions on the decay of V and admissible range of p 2 are optimal. The proof uses variational methods and a novel nonlocal penalization technique that we develop in this work.