Multi-Peak solutions to Chern-Simons-Schr\"odinger systems with non-radial potential

Abstract

In this paper, we consider the existence of static solutions to the nonlinear Chern-Simons-Schr\"odinger system equationeqabstr \arrayll -ihD0-h2(D1D1+D2D2)+V=||p-2,\\ ∂0A1-∂1A0=- 12ih[D2-D2],\\ ∂0A2-∂2A0= 12ih[D1-D1],\\ ∂1A2-∂2A1=-12||2,\\ array . equation where p>2 and non-radial potential V(x) satisfies some certain conditions. We show that for every positive integer k, there exists h0>0 such that for 0<h<h0, problem eqabstr has a nontrivial static solution (h, A0h, A1h,A2h). Moreover, h is a positive non-radial function with k positive peaks, which approach to the local maximum point of V(x) as h 0+.