On orientations for gauge-theoretic moduli spaces
Abstract
Let be a compact manifold, a real elliptic operator on , a Lie group, a principal -bundle, and the infinite-dimensional moduli space of all connections on modulo gauge, as a topological stack. For each , we can consider the twisted elliptic operator on X. This is a continuous family of elliptic operators over the base , and so has an orientation bundle , a principal -bundle parametrizing orientations of KerCoker at each . An orientation on is a trivialization . In gauge theory one studies moduli spaces of connections on satisfying some curvature condition, such as anti-self-dual instantons on Riemannian 4-manifolds . Under good conditions is a smooth manifold, and orientations on pull back to orientations on in the usual sense under the inclusion . This is important in areas such as Donaldson theory, where one needs an orientation on to define enumerative invariants. We explain a package of techniques, some known and some new, for proving orientability and constructing canonical orientations on , after fixing some algebro-topological information on . We use these to construct canonical orientations on gauge theory moduli spaces, including new results for moduli spaces of flat connections on 2- and 3-manifolds, instantons, Kapustin-Witten and Vafa-Witten equations on 4-manifolds, and the Haydys-Witten equations on 5-manifolds. Two sequels arXiv:1811.02405, arXiv:1811.09658 discuss orientations in 7 and 8 dimensions.
Cite
@article{arxiv.1811.01096,
title = {On orientations for gauge-theoretic moduli spaces},
author = {Dominic Joyce and Yuuji Tanaka and Markus Upmeier},
journal= {arXiv preprint arXiv:1811.01096},
year = {2022}
}
Comments
60 pages. (v2) sections 2.3-2.5 rewritten