Rudiments of Dual Feynman Rules for Yang-Mills Monopoles in Loop Space
Abstract
Dual Feynman rules for Dirac monopoles in Yang-Mills fields are obtained by the Wu-Yang (1976) criterion in which dynamics result as a consequence of the constraint defining the monopole as a topological obstruction in the field. The usual path-integral approach is adopted, but using loop space variables of the type introduced by Polyakov (1980). An anti-symmetric tensor potential Lμ[|s] appears as the Lagrange multiplier for the Wu-Yang constraint which has to be gauge-fixed because of the ``magnetic'' U-symmetry of the theory. Two sets of ghosts are thus introduced, which subsequently integrate out and decouple. The generating functional is then calculated to order g0 and expanded in a series in g. It is shown to be expressible in terms of a local ``dual potential'' Aμ (x) found earlier, which has the same progagator and the same interaction vertex with the monopole field as those of the ordinary Yang-Mills potential Aμ with a colour charge, indicating thus a certain degree of dual symmetry in the theory. For the abelian case the Feynman rules obtained here are the same as in QED to all orders in g, as expected by dual symmetry.
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