Multiplicity and orbital stability of normalized solutions to non-autonomous Schr\"odinger equation with mixed nonlinearities
Abstract
This paper studies the multiplicity of normalized solutions to the Schr\"odinger equation with mixed nonlinearities equation* cases - u=λ u+h(ε x)|u|q-2u+η |u|p-2u, x∈ RN, \\ ∫RN|u|2dx=a2, cases equation* where a, ε, η>0, q is L2-subcritical, p is L2-supercritical, λ∈ R is an unknown parameter that appears as a Lagrange multiplier, h is a positive and continuous function. It is proved that the numbers of normalized solutions are at least the numbers of global maximum points of h when ε is small enough. Moreover, the orbital stability of the solutions obtained is analyzed as well. In particular, our results cover the Sobolev critical case p=2N/(N-2).
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