Normalized ground states to a cooperative system of Schr\"odinger equations with generic L2-subcritical or L2-critical nonlinearity
Abstract
We look for ground state solutions to the Schr\"odinger-type system \[ cases - uj + λj uj = ∂jF(u)\\ ∫ uj2 \, dx = aj2\\ (λj,uj) ∈ R × H1(RN) cases j ∈ \1,…,M\ \] with N,M1, where a=(a1,…,aM) ∈ ]0,∞[M is prescribed and (λ,u) = (λ1,…,λM,u1,… uM) is the unknown. We provide generic assumptions about the nonlinearity F which correspond to the L2-subcritical and L2-critical cases, i.e., when the energy is bounded from below for all or some values of a. Making use of a recent idea, we minimize the energy over the constraint |uj|L2 aj for all j and then provide further assumptions that ensure |uj|L2=aj.
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