Extended moduli spaces and the Kan construction.II.Lattice gauge theory
Abstract
Let Y be a CW-complex with a single 0-cell, K its Kan group, a model for the loop space of Y, and let G be a compact, connected Lie group. We give an explicit finite dimensional construction of generators of the equivariant cohomology of the geometric realization of the cosimplicial manifold Hom(K,G) and hence of the space Mapo(Y,BG) of based maps from Y to the classifying space BG. For a smooth manifold Y, this may be viewed as a rigorous approach to lattice gauge theory, and we show that it then yields, (i) when dim(Y)=2, equivariant de Rham representatives of generators of the equivariant cohomology of twisted representation spaces of the fundamental group of a closed surface including generators for moduli spaces of semi stable holomorphic vector bundles on complex curves so that, in particular, the known structure of a stratified symplectic space results; (ii) when dim(Y)=3, equivariant cohomology generators including the Chern-Simons function; (iii) when dim(Y) = 4, the generators of the relevant equivariant cohomology from which for example Donaldson polynomials are obtained by evaluation against suitable fundamental classes corresponding to moduli spaces of ASD connections.
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