Normalized vector solutions of nonlinear Schr\"odinger systems

Abstract

Given μ>0 we look for solutions λ∈R and v1,…,vk∈ H1(RN) of the system \[ cases - vi+ λ vi+Vi(x)vi = Σj=1kβij vivj2 & in RN, i=1,…,k, ∫RN (v12+…+vk2 )d x = μ, cases\] where N=1,2,3, Vi: RN R and βij∈R satisfy βij=βji and βii>0. Under suitable assumptions on the βij's, given a non-degenerate critical point 0 of a suitable linear combination of the potentials Vi, we build solutions whose components concentrate at 0 as the prescribed global mass μ is either large (when N=1) or small (when N=3) or it approaches some critical threshold (when N=2).

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