Homotopy classes of gauge fields and the lattice

Abstract

For a smooth manifold M, possibly with boundary and corners, and a Lie group G, we consider a suitable description of gauge fields in terms of parallel transport, as groupoid homomorphisms from a certain path groupoid in M to G. Using a cotriangulation C of M, and collections of finite-dimensional families of paths relative to C, we define a homotopical equivalence relation of parallel transport maps, leading to the concept of an extended lattice gauge (ELG) field. A lattice gauge field, as used in Lattice Gauge Theory, is part of the data contained in an ELG field, but the latter contains further local topological information sufficient to reconstruct a principal G-bundle on M up to equivalence. The space of ELG fields of a given pair (M,C) is a covering for the space of fields in Lattice Gauge Theory, whose connected components parametrize equivalence classes of principal G-bundles on M. We give a criterion to determine when ELG fields over different cotriangulations define equivalent bundles.