The diffential geometry of composition sequences of differentiable manifolds
Abstract
Let F_0=B,...,F_n be a sequence of differentiable manifolds, G_i a Lie subgroup of diffeomorphisms of F_i, and H_i a subgroup of G_i central in G_i. We suppose also given a locally trivial bundle p_{K_i} over F_{i-1} which typical fiber is K_i the quotient of G_i by H_i. The aim of this paper is to study the differential geometry of the following problem: classify sequences M_n\to...M_1, where each map from M_i to M_{i-1} is a locally trivial fibration which typical fiber is F_i and which transition functions image are elements of G_i. We associate to this problem a tower of gerbes and define for it the notion of connective structure, curvature and holonomy using the notion of free transitive distribution (free TD)
Keywords
Cite
@article{arxiv.math/0210102,
title = {The diffential geometry of composition sequences of differentiable manifolds},
author = {A. Tsemo},
journal= {arXiv preprint arXiv:math/0210102},
year = {2007}
}
Comments
13 pages, 10 references, we define the notion of holonomy in this version