Existence and nonexistence of normalized solutions for nonlinear Schr\"odinger equation involving combined nonlinearities in bounded domain

Abstract

In this paper, we consider the existence, multiplicity and nonexistence of solutions for the following equation equation* cases aligned &- u+ω u=μ up-1+uq-1,~ u>0 && in , \\ &u=0 && on ∂, \\ aligned cases equation* with prescribed L2-norm \|u\|22=, where N 1, >0, μ∈ R, 1<p q, and ⊂RN is a bounded smooth domain. The parameter ω∈R arises as a Lagrange multiplier. Firstly, when 2<p q 2N(N-2)+ and is small, we establish the existence of a local minimizer of energy. Furthermore, when μ 0 and is a star-shaped domain, using the monotonicity trick and the Pohozaev identity, we show that there exists a second solution which is of mountain pass type. Secondly, when μ 0, N 3, 1<p 2, q \2NN-2, 3\ and is a convex domain, using the moving-plane method, we prove the nonexistence of normalized solutions for large . Finally, when μ=0, N 3, q=2NN-2 and is a ball, we give a dichotomy result of normalized solutions for the Br\'ezis-Nirenberg problem by continuation arguments.