Normalized Solutions to Schr\"odinger Equations with Critical Exponent and Mixed Nonlocal Nonlinearities

Abstract

We study the existence and nonexistence of normalized solutions (ua, λa)∈ H1(RN)× R to the nonlinear Schr\"odinger equation with mixed nonlocal nonlinearities. This study can be viewed as a counterpart of the Brezis-Nirenberg problem in the context of normalized solutions to the nonlocal Schr\"odiger equation with a fixed L2-norm \|u\|2=a>0. The leading term is L2-supercritical, that is, p∈ (N+α+2N,N+αN-2], where the Hardy-Littlewood-Sobolev critical exponent p=N+αN-2 appears. We first prove that there exist two normalized solutions if q∈ (N+αN,N+α+2N) with μ >0 small, that is, one is at the negative energy level while the other one is at the positive energy level. For q=N+α+2N, we show that there is a normalized ground state for 0<μ < μ and there exist no ground states for μ >μ, where μ is a sharp positive constant. If q∈ (N+α+2N,N+αN-2), we deduce that there exists a normalized ground state for any μ>0. We also obtain some existence and nonexistence results for the case μ<0 and q∈ (N+αN,N+α+2N]. Besides, we analyze the asymptotic behavior of normalized ground states as μ→ 0+.