Monopoles, noncommutative gauge theories in the BPS limit and some simple gauge groups
Abstract
For three conspicuous gauge groups, namely, SU(2), SU(3) and SO(5), and at first order in the noncommutative parameter matrix hθμ, we construct smooth monopole --and, some two-monopole-- fields that solve the noncommutative Yang-Mills-Higgs equations in the BPS limit and that are formal power series in hθμ. We show that there exist noncommutative BPS (multi-)monopole field configurations that are formal power series in hθμ if, and only if, two a priori free parameters of the Seiberg-Witten map take very specific values. These parameters, that are not associated to field redefinitions nor to gauge transformations, have thus values that give rise to sharp physical effects.
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