The singularities of Yang-Mills connections for bundles on a surface. II. The stratification
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 are defined. In an earlier paper we determined the local structure of the moduli space N() of central Yang-Mills connections on near an arbitrary point. Here we show that the decomposition of N() into connected components of orbit types of central Yang-Mills connections is a stratification in the strong (i.~e. Whitney) sense; furthermore each stratum, being a smooth manifold, inherits a finite volume symplectic structure from the given data. This complements, in a way, results of Atiyah-Bott in that it will in general decompose further the critical sets of the corresponding Yang-Mills functional into smooth pieces.
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