Normalized solutions for Schr\"odinger equations with critical Sobolev exponent and mixed nonlinearities

Abstract

In this paper, we consider the following nonlinear Schr\"odinger equations with mixed nonlinearities: eqnarray* \ &- u=λ u+μ |u|q-2u+|u|2*-2u RN,\\ &u∈ H1(N),∫Nu2=a2, . eqnarray* where N≥3, μ>0, λ∈R and 2<q<2*. We prove in this paper enumerate [(1)] Existence of solutions of mountain-pass type for N=3 and 2<q<2+4N . [(2)] Existence and nonexistence of ground states for 2+4N≤ q<2* with μ>0 large. [(3)] Precisely asymptotic behaviors of ground states and mountain-pass solutions as μ0 and μ goes to its upper bound. enumerate Our studies answer some questions proposed by Soave in [Remarks~1.1, 1.2 and 8.1]S20.