NODAL Vector solutions with clustered peaks for a nonlinear elliptic equations in 3

Abstract

In this paper, we study the following coupled nonlinear Schr\"odinger system in 3 \% arrayll -ε2 u +P(x)u=μ1 u3+β v2u,~~&x∈ 3,0.15cm\\ -ε2 v +Q(x)v=μ2 v3+β u2v,~~&x∈ 3,\\ array% . where μ1 >0,μ2>0 and β ∈ is a coupling constant. Whether the system is repulsive or attractive, we prove that it has nodal semi-classical segregated or synchronized bound states with clustered spikes for sufficiently small ε under some additional conditions on P(x), Q(x) and β. Moreover, the number of this type of solutions will go to infinity as ε 0+.