Infinitely many non-radial solutions to a critical Choquard equation

Abstract

In this paper we study a class of critical Choquard equations with a symmetric potential, i.e. we consider the equation - u +V(|x|) u =(|x|-μ* |u|2μ)|u|2μ-2u,in RN where V(|x|) is a bounded, nonnegative and symmetric potential in RN with N≥ 5, 0<μ≤ 4, * stands for the standard convolution and 2μ:=2N-μN-2 is the upper critical exponent in the sense of the Hardy - Littlewood - Sobolev inequality. By applying a finite dimensional reduction method we prove that if r2V(r) has a local maximum point or local minimum point r0>0 with V(r0)>0 then the problem has infinitely many non-radial solutions with arbitrary large energies.