Nonexistence, existence and symmetry of normalized ground states to Choquard equations with a local perturbation

Abstract

We study the Choquard equation with a local perturbation equation* - u=λ u+(Iα|u|p)|u|p-2u+μ|u|q-2u,\ x∈ RN equation* having prescribed mass equation* ∫RN|u|2dx=a2. equation* For a L2-critical or L2-supercritical perturbation μ|u|q-2u, we prove nonexistence, existence and symmetry of normalized ground states, by using the mountain pass lemma, the Pohozaev constraint method, the Schwartz symmetrization rearrangements and some theories of polarizations. In particular, our results cover the Hardy-Littlewood-Sobolev upper critical exponent case p=(N+α)/(N-2). Our results are a nonlocal counterpart of the results in Li 2021-4,Soave JFA,Wei-Wu 2021.