Nonstandard solutions for a perturbed nonlinear Schr\"odinger system with small coupling coefficientsA perturbed nonlinear Schr\"odinger system

Abstract

In this paper, we consider the following weakly coupled nonlinear Schr\"odinger system equation* \ arrayll -ε2 u1 + V1(x)u1 = |u1|2p - 2u1 + β|u1|p - 2|u2|pu1, & x∈ RN,\\ -ε2 u2 + V2(x)u2 = |u2|2p - 2u2 + β|u2|p - 2|u1|pu2, & x∈ RN, array . equation* where ε>0, β∈R is a coupling constant, 2p∈ (2,2*) with 2* = 2NN - 2 if N≥ 3 and +∞ if N = 1,2, V1 and V2 belong to C(RN,[0,∞)). When p 2 and β>0 is suitably small, we show that the problem has a family of nonstandard solutions \wε = (u1ε,u2ε):0<ε<ε0\ concentrating synchronously at the common local minimum of V1 and V2. All decay rates of Vi(i=1,2) are admissible and we can allow that β>0 is close to 0 in this paper. Moreover, the location of concentration points is given by local Pohozaev identities. Our proofs are based on variational methods and the penalized technique.