Non-Abelian Yang-Mills-Higgs vortices

Abstract

In this Letter we present new, genuinely non-Abelian vortex solutions in SU(2) Yang-Mills--Higgs theory with only one isovector scalar field. These non-Abelian solutions branch off their Abelian counterparts (Abrikosov-Nielsen-Olesen vortices) for precise values of the Higgs potential coupling constant λ. For all values of λ, their energies lie below those of the Abelian energy profiles, the latter being logarithmically divergent as λ∞. The non-Abelian branches plateau in the limit λ∞ and their number increases with λ, this number becoming infinite. For each vorticity, the gaps between the plateauing energy levels become constant. In this limit the non-Abelian vortices are non-interacting and are described by the self-dual vortices of the O(3) sigma model. In the absence of a topological lower bound, we expect these non-Abelian vortices to be sphalerons.