Normalized positive solutions for Schr\"odinger equations with potentials in unbounded domains

Abstract

The paper deals with the existence of positive solutions with prescribed L2 norm for the Schr\"odinger equation - u+λ u+V(x)u=|u|p-2u, u∈ H10(),∫ u2dx=2,λ∈R, where =RN or RN is a compact set, >0, V 0 (also V 0 is allowed), p∈ (2,2+ 4 N). The existence of a positive solution u is proved when V verifies a suitable decay assumption (D), or if \|V\|Lq is small, for some q N2 (q>1 if N=2). No smallness assumption on V is required if the decay assumption (D) is fulfilled. There are no assumptions on the size of RN. The solution u is a bound state and no ground state solution exists, up to the autonomous case V 0 and =RN.