Existence and nonexistence of solutions to Choquard equations

Abstract

In this paper, we establish the existence of ground state solutions for Choquard equations equationeq 1 - u + u = q\,(Iα |u|p) |u|q - 2 u+p\,(Iα |u|q) |u|p - 2 u in RN, equation where N 3, α ∈ (0, N), Iα: RN R is the Riesz potential, p,\,q >0 satisfying that equationeq 2 2(N+α)N<p+q< 2(N+α)N-2. equation Moreover, we prove a Pohozaev type identity for this Choquard equation, which implies the non-existence result for the problem when (p,q) does not satisfy the above condition.