Normalized solutions for a system of coupled cubic Schr\"odinger equations on R3

Abstract

We consider the system of coupled elliptic equations \[ cases - u - λ1 u = μ1 u3+ β u v2 \\ - v- λ2 v = μ2 v3 +β u2 v cases in R3, \] and study the existence of positive solutions satisfying the additional condition \[ ∫R3 u2 = a12 and ∫R3 v2 = a22. \] Assuming that a1,a2,μ1,μ2 are positive fixed quantities, we prove existence results for different ranges of the coupling parameter β>0. The extension to systems with an arbitrary number of components is discussed, as well as the orbital stability of the corresponding standing waves for the related Schr\"odinger systems.