Semi-classical states for the nonlinear Choquard equations: existence, multiplicity and concentration at a potential well

Abstract

We study existence and multiplicity of semi-classical states for the nonlinear Choquard equation: -2 v+V(x)v = 1α(Iα*F(v))f(v) in\ RN, where N≥ 3, α∈ (0,N), Iα(x)=Aα |x|N-α is the Riesz potential, F∈ C1(R,R), F'(s) = f(s) and >0 is a small parameter. We develop a new variational approach and we show the existence of a family of solutions concentrating, as 0, to a local minima of V(x) under general conditions on F(s). Our result is new also for f(s)=|s|p-2s and applicable for p∈ (N+αN, N+αN-2). Especially, we can give the existence result for locally sublinear case p∈ (N+αN, 2), which gives a positive answer to an open problem arisen in recent works of Moroz and Van Schaftingen. We also study the multiplicity of positive single-peak solutions and we show the existence of at least cupl(K)+1 solutions concentrating around K as 0, where K⊂ is the set of minima of V(x) in a bounded potential well , that is, m0 ∈fx∈ V(x) < ∈fx∈ ∂V(x) and K=\x∈;\, V(x)=m0\.