Multiple Solutions for the Non-Abelian Chern--Simons--Higgs Vortex Equations

Abstract

In this paper we study the existence of multiple solutions for the non-Abelian Chern--Simons--Higgs (N× N)-system: \[ ui=λ(Σj=1NΣk=1N KkjKjiujuk-Σj=1N Kjiuj)+4πΣj=1niδpij, i=1,…, N; \] over a doubly periodic domain , with coupling matrix K given by the Cartan matrix of SU(N+1), (see k1 below). Here, λ>0 is the coupling parameter, δp is the Dirac measure with pole at p and ni∈ N, for i=1, …, N. When N=1, 2 many results are now available for the periodic solvability of such system and provide the existence of different classes of solutions known as: topological, non-topological, mixed and blow-up type. On the contrary for N 3, only recently in haya1 the authors managed to obtain the existence of one doubly periodic solution via a minimisation procedure, in the spirit of nota . Our main contribution in this paper is to show (as in nota) that actually the given system admits a second doubly periodic solutions of "Mountain-pass" type, provided that 3 N 5. Note that the existence of multiple solutions is relevant from the physical point of view. Indeed, it implies the co-existence of different non-Abelian Chern--Simons condensates sharing the same set (assigned component-wise) of vortex points, energy and fluxes. The main difficulty to overcome is to attain a "compactness" property encompassed by the so called Palais--Smale condition for the corresponding "action" functional, whose validity remains still open for N 6.