Normalized solutions for a coupled Schr\"odinger system

Abstract

In the present paper, we prove the existence of solutions (λ1,λ2,u,v)∈R2× H1(R3,R2) to systems of coupled Schr\"odinger equations cases - u+λ1u=μ1 u3+β uv2 &in\;R3\\ - v+λ2v=μ2 v3+β u2v&in\;R3\\ u,v>0&in\;R3 cases satisfying the normalization constraint ∫R3u2=a2and\;∫R3v2=b2, which appear in binary mixtures of Bose-Einstein condensates or in nonlinear optics. The parameters μ1,μ2,β>0 are prescribed as are the masses a,b>0. The system has been considered mostly in the fixed frequency case. And when the masses are prescribed, the standard approach to this problem is variational with λ1,λ2 appearing as Lagrange multipliers. Here we present a new approach based on bifurcation theory and the continuation method. We obtain the existence of normalized solutions for any given a,b>0 for β in a large range. We also give a result about the nonexistence of positive solutions. From which one can see that our existence theorem is almost the best. Especially, if μ1=μ2 we prove that normalized solutions exist for all β>0 and all a,b>0.