Multi-bump solutions for Choquard equation with deepening potential well

Abstract

We study the existence of multi-bump solutions to Choquard equation arrayll - u + (λ a(x)+1)u=(1|x|μ |u|p)|u|p-2u in \,\,\, 3, array where μ ∈ (0,3), p∈(2, 6-μ), λ is a positive parameter and the nonnegative function a(x) has a potential well :=int (a-1(0)) consisting of k disjoint bounded components :=j=1kj. We prove that if the parameter λ is large enough then the equation has at least 2k-1 multi-bump solutions.