Ground state of indefinite coupled nonlinear Schr\"odinger systems

Abstract

In this paper, we study the ground state solutions of the following coupled nonlinear Schr\"odinger system (P) - u1-τ1 u1 =μ1u13+β u1u22, - u2-τ2 u2 =μ2u23+β u12u2 in , u1=u2=0 on ∂, where μ1, μ2>0, β>0 and ⊂ RN (N3) is a bounded domain with smooth boundary. We are concerned with the indefinite case, i.e., τ1, τ2 are greater than or equal to the principal eigenvalue of - with the Dirichlet boundary datum. By delicate variational arguments, we obtain the existence of ground state solution to (P), and also provide information on critical energy levels for coupling parameter β in some ranges.