Regularity of Lie Groups
Abstract
We solve the regularity problem for Milnor's infinite dimensional Lie groups in the -topological context, and provide necessary and sufficient regularity conditions for the (standard) -topological setting. We prove that the evolution map is -continuous on its domain the Lie group is locally -convex. We furthermore show that if the evolution map is defined on all smooth curves, then is Mackey complete. Under the assumption that is locally -convex, we show that each -curve for is integrable (contained in the domain of the evolution map) is Mackey complete and -confined. The latter condition states that each -curve in the Lie algebra of can be uniformly approximated by a special type of sequence that consists of piecewise integrable curves. A similar result is proven for the case ; and, we provide several mild conditions that ensure that is -confined for each . We finally discuss the differentiation of parameter-dependent integrals in the (standard) -topological context. In particular, we show that if the evolution map is defined and continuous on for , then it is smooth thereon it is differentiable at zero is Mackeyintegral complete for . This result is obtained by calculating the directional derivatives explicitly, recovering the standard formulas that hold, e.g., in the Banach case.
Keywords
Cite
@article{arxiv.1711.03508,
title = {Regularity of Lie Groups},
author = {Maximilian Hanusch},
journal= {arXiv preprint arXiv:1711.03508},
year = {2022}
}
Comments
72 pages. Version as published in Communications in Analysis and Geometry