Studies of normalized solutions to Schr\"odinger equations with Sobolev critical exponent and combined nonlinearities

Abstract

We consider the Sobolev critical Schr\"odinger equation with combined nonlinearities equation* cases - u=λ u+|u|2*-2u+μ|u|q-2u,\ \ x∈RN,\\ u∈ H1(RN),\ ∫RN|u|2dx=a, cases equation* where N≥ 3, μ>0, λ∈ R, a>0 and q∈ (2,2*). We prove in this paper (1) Multiplicity and stability of solutions for q∈ (2,2+4N) and μ aq(1-γq)2≤ (2K)qγq-2*2*-2 with γq:=N2-Nq and K being some positive constant. This result extends the results obtained in Jeanjean et al. JEANJEAN-JENDREJ and Jeanjean and Le Jeanjean-Le for the case μ aq(1-γq)2<(2K)qγq-2*2*-2 to the case μ aq(1-γq)2≤ (2K)qγq-2*2*-2. (2) Nonexistence of ground states for q=2+4N and μ aq(1-γq)2≥aN with aN being some positive constant. We give a new proof to this result different with Wei and Wu Wei-Wu 2021.