Non-Abelian duality from vortex moduli: a dual model of color-confinement

Abstract

It is argued that the dual transformation of non-Abelian monopoles occurring in a system with gauge symmetry breaking G -> H is to be defined by setting the low-energy H system in Higgs phase, so that the dual system is in confinement phase. The transformation law of the monopoles follows from that of monopole-vortex mixed configurations in the system (with a large hierarchy of energy scales, v1 >> v2) G -> H -> 0, under an unbroken, exact color-flavor diagonal symmetry HC+F H. The transformation property among the regular monopoles characterized by π2(G/H), follows from that among the non-Abelian vortices with flux quantized according to π1(H), via the isomorphism π1(G) π1(H) / π2(G/H). Our idea is tested against the concrete models -- softly-broken N=2 supersymmetric SU(N), SO(N) and USp(2N) theories, with appropriate number of flavors. The results obtained in the semiclassical regime (at v1 >> v2 >> ) of these models are consistent with those inferred from the fully quantum-mechanical low-energy effective action of the systems (at v1, v2 ).

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