Existence and local uniqueness of multi-peak solutions for the Chern-Simons-Schr\"odinger system

Abstract

In the present paper, we consider the Chern-Simons-Schr\"odinger system equation \ aligned &-2 u+V(x)u+(A0+A12+A22)u=|u|p-2u,\,\,\,\,x∈ R2,\\ &∂1 A0 = A2 u2,\ ∂2A0=-A1u2,\\ &∂1A2-∂2A1=-12|u|2,\ ∂1A1+∂2A2=0,\\ aligned . equation where p>2, >0 is a parameter and V:R2→R is a bounded continuous function. Under some mild assumptions on V(x), we show the existence and local uniqueness of positive multi-peak solutions. Our methods mainly use the finite dimensional reduction method, various local Pohozaev identities, blow-up analysis and the maximum principle. Because of the nonlocal terms involved by A0,A1 and A2, we have to obtain a series of new and technical estimates.