Bundle type sub-Riemannian structures on holonomy bundles
Abstract
In this paper, combining the Rashevsky-Chow-Sussmann (orbit) theorem with the Ambrose-Singer theorem, we introduce the notion of controllable principal connections on principal -bundles. Using this concept, under a mild assumption of compactness, we estimate the Gromov-Hausdorff distance between principal -bundles and certain reductive homogeneous -spaces. In addition, we prove that every reduction of the structure group to a closed connected subgroup gives rise to a sequence of Riemannian metrics on the total space for which the underlying sequence of metric spaces converges, in the Gromov-Housdorff topology, to a normal reductive homogeneous -space. This last finding allows one to detect the presence of certain reductive homogeneous -spaces in the Gromov-Housdorff closure of the moduli space of Riemannian metrics of the total space of the bundle through topological invariants provided by obstruction theory.
Cite
@article{arxiv.2407.01427,
title = {Bundle type sub-Riemannian structures on holonomy bundles},
author = {Eder M. Correa and Giovane Galindo and Lino Grama},
journal= {arXiv preprint arXiv:2407.01427},
year = {2024}
}
Comments
13 pages, Comments are welcome