S-Duality for Non-Abelian Monopoles

Abstract

In N=4 super-Yang-Mills theory with gauge group G spontaneously broken to a subgroup H, S-duality requires that the BPS monopole spectrum organizes into the same representation as W-bosons in the dual theory, where G is broken to H. The expectation has been extensively verified in the maximally broken phase G U(1)r. Here we address the non-Abelian regime in which H contains a semisimple factor Hs. Using the stratified description of monopole moduli space, we give a general proof of this matching for any simple gauge group G. Each BPS monopole state is naturally labeled by a weight of the relevant W-boson representation of (H)s. We construct non-Abelian magnetic gauge transformation operators implementing the (H)s-action on the monopole Hilbert space, which commute with the electric Hs-transformations and thereby realize the Hs× (H)s symmetry at the level of monopole quantum mechanics.

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