The singularities of Yang-Mills connections for bundles on a surface. I. The local model

Abstract

Let be a closed surface, G a compact Lie group, not necessarily connected, with Lie algebra g, endowed with an adjoint action invariant scalar product, let P be a principal G-bundle, and pick a Riemannian metric and orientation on , so that the corresponding Yang-Mills equations dA*KA = 0 are defined, where KA refers to the curvature of a connection A. For every central Yang-Mills connection A, the data induce a structure of unitary representation of the stabilizer ZA on the first cohomology group H1A(,ad()) with coefficients in the adjoint bundle ad(), with reference to A, with momentum mapping A from H1A(,ad()) to the dual z*A of the Lie algebra zA of ZA. We show that, for every central Yang-Mills connection A, a suitable Kuranishi map identifies a neighborhood of zero in the Marsden-Weinstein reduced space HA for A with a neighborhood of the point [A] in the moduli space of central Yang-Mills connections on .

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