Loop groups in Yang-Mills theory
Abstract
We consider the Yang-Mills equations with a matrix gauge group on the de Sitter dS, anti-de Sitter AdS and Minkowski spaces. On all these spaces one can introduce a doubly warped metric in the form , where and are the functions of and is the metric on the two-dimensional hyperbolic space . We show that in the adiabatic limit, when the metric on is scaled down, the Yang-Mills equations become the sigma-model equations describing harmonic maps from a two-dimensional manifold (dS, AdS or , respectively) into the based loop group of smooth maps from the boundary circle of into the gauge group . From this correspondence and the implicit function theorem it follows that the moduli space of Yang-Mills theory with a gauge group in four dimensions is bijective to the moduli space of two-dimensional sigma model with as the target space. The sigma-model field equations can be reduced to equations of geodesics on , solutions of which yield magnetic-type configurations of Yang-Mills fields. The group naturally acts on their moduli space.
Cite
@article{arxiv.1505.06634,
title = {Loop groups in Yang-Mills theory},
author = {Alexander D. Popov},
journal= {arXiv preprint arXiv:1505.06634},
year = {2016}
}
Comments
8 pages; v3: clarifying remarks and references added