Nonlinear Perturbations of a periodic magnetic Choquard equation with Hardy-Littlewood-Sobolev critical exponent

Abstract

In this paper, we consider the following magnetic nonlinear Choquard equation \[-(∇+iA(x))2u+ V(x)u = (1|x|α*|u|2α*) |u|2α*-2 u + λ f(u)\ in \ N,\] where 2α*=2N-αN-2 is the critical exponent in the sense of the Hardy-Littlewood-Sobolev inequality, λ>0, N≥ 3, 0<α< N, A: RN→ RN is an C1, ZN-periodic vector potential and V is a continuous scalar potential given as a perturbation of a periodic potential. Under suitable assumptions on different types of nonlinearities f, namely, f(x,u)=(1|x|α*|u|p)|u|p-2 u for (2N-α)/N<p<2*α, then f(u)=|u|p-1 u for 1<p<2*-1 and f(u)=|u|2* - 2u (where 2*=2N/(N-2)), we prove the existence of at least one ground state solution for this equation by variational methods if p belongs to some intervals depending on N and λ.