Normalized Schr\"odinger equations with mass-supercritical nonlinearity in exterior domains

Abstract

We consider the problem - u+λ u=up-1, where u∈ H10() verifies \|u\|L2=m>0, and λ∈ [0,+∞). Here, RN is nonempty and compact. We prove the existence of a solution with a constrained Morse index lower than or equal to N+1, both in the case m fixed and RN in a small ball and in the case fixed and m large.

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