Normalized solution to the Sch\"odinger equation with potential and general nonlinear term: Mass super-critical case

Abstract

In present paper, we prove the existence of solutions (λ, u)∈ × H1(N) to the following Schr\"odinger equation cases - u(x)+V(x)u(x)+λ u(x)=g(u(x)) &in~N\\ 0≤ u(x)∈ H1(N), N≥ 3 cases satisfying the normalization constraint ∫Nu2 dx=a. We treat the so-called mass super-critical case here. Under an explicit smallness assumption on V and some Ambrosetti-Rabinowitz type conditions on g, we can prove the existence of ground state normalized solutions for prescribed mass a>0. Furthermore, we emphasize that the mountain pass characterization of a minimizing solution of the problem ∈f\∫ [12|∇ u|2+12V(x)u2-G(u)]dx : \|u\|L2(N)2=a, P[u]=0\, where G(s)=∫0s g(τ)dτ and P[u]=∫[|∇ u|2-12 ∇ V(x), x u2 -N(12g(u)u-G(u))]dx.