Locally homogeneous triples. Extension theorems for parallel sections and parallel bundle isomorphisms

Abstract

Let M be a differentiable manifold and K a Lie group. A locally homogeneous triple with structure group K on M is a triple (g, Pp M,A), where p:P M is a principal K-bundle on M, g is Riemannian metric on M, and A is connection on P such that the following locally homogeneity condition is satisfied: for every two points x, x'∈ M there exists an isometry :U U' between open neighborhoods U x, U' x' with (x)=x', and a -covering bundle isomorphism :PU PU' such that *(AU')=AU. If (g,Pp M,A) is a locally homogeneous triple on M, one can endow the total space P with a locally homogeneous Riemannian metric such that p becomes a Riemannian submersion and K acts by isometries. Therefore the classification of locally homogeneous triples on a given manifold M is an important problem: it gives an interesting class of geometric manifolds which are fibre bundles over M. In this article we will prove a classification theorem for locally homogeneous triples. We will use this result in a future article in order to describe explicitly moduli spaces of locally homogeneous triples on Riemann surfaces.