Normalized ground states solutions for nonautonomous Choquard equations

Abstract

In this paper, we study normalized ground state solutions for the following nonautonomous Choquard equation: - u-λ u=(1|x|μ A|u|p)A|u|p-2u, ∫RN|u|2dx=c, u∈ H1(RN,R), where c>0, 0<μ<N, λ∈R, A∈ C1(RN,R). For p∈(2*,μ, p), we prove that the Choquard equation possesses ground state normalized solutions, and the set of ground states is orbitally stable. For p∈ (p,2*μ), we find a normalized solution, which is not a global minimizer. 2*μ and 2*,μ are the upper and lower critical exponents due to the Hardy-Littlewood-Sobolev inequality, respectively. p is L2-critical exponent. Our results generalize and extend some related results.