Multiple solutions to a magnetic nonlinear Choquard equation

Abstract

We consider the stationary nonlinear magnetic Choquard equation [(-i∇+A(x))2u+V(x)u=(1|x|α |u|p) |u|p-2u, x∈RN%] where A\ is a real valued vector potential, V is a real valued scalar potential, N≥3, α∈(0,N) and 2-(α/N) <p<(2N-α)/(N-2). \ We assume that both A and V are compatible with the action of some group G of linear isometries of RN. We establish the existence of multiple complex valued solutions to this equation which satisfy the symmetry condition \[ u(gx)=τ(g)u(x)\ \ \ for allg∈ G,x∈RN, \] where τ:G→S1 is a given group homomorphism into the unit complex numbers.