Doubly Periodic Self-Dual Vortices for a Relativistic Non-Abelian Chern--Simons Model

Abstract

In this paper we establish a multiplicity result concerning the existence of doubly periodic solutions for a 2×2 nonlinear elliptic system arising in the study of self-dual non-Abelian Chern--Simons vortices. We show that the given system admits at least two solutions when the Chern--Simons coupling parameter >0 is sufficiently small; while no solutions exist for >0 sufficiently large. As in [36] we use a variational formulation of the problem. Thus, we obtain a first solution via a (local) minimization method and show that it is asymptotically gauge-equivalent to the (broken) principal embedding vacuum of the system, as 0. Then we obtain the second solution by a min-max procedure of "mountain pass" type.