Integrating curved Yang-Mills gauge theories

Abstract

We construct a gauge theory based on principal bundles P equipped with a right G-action, where G is a Lie group bundle instead of a Lie group. Due to the fact that a G-action acts fibre by fibre, pushforwards of tangent vectors via a right-translation act now only on the vertical structure of P. Thus, we generalize pushforwards using a connection on G which will modify the pushforward. A horizontal distribution on P invariant under such a modified pushforward will provide a proper notion of Ehresmann connection. For achieving gauge invariance we impose conditions on the connection 1-form μ on G: μ has to be a multiplicative form, i.e.\ closed w.r.t.\ a certain simplicial differential δ on G, and the curvature Rμ of μ has to be δ-exact with primitive ζ; μ will be the generalization of the Maurer-Cartan form of the classical gauge theory, while the δ-exactness of Rμ will generalize the role of the Maurer-Cartan equation. This introduces the notion of multiplicative Yang-Mills connections, a connection which helped classifying singular foliations and symmetry breaking. For allowing curved connections on G in the dynamical theory we will need to generalize the typical definition of the curvature/field strength F on P by adding ζ to F. Several examples for a gauge theory with a curved μ will be provided, including the inner group bundle of the Hopf fibration S7 S4, and a classification for gauge theories with structural semisimple group bundles will be provided, including a classification for whether these theories admit a classical description.