Flat Affine Manifolds And Their Transformations
Abstract
We give a characterization of flat affine connections on manifolds by means of a natural affine representation of the universal covering of the Lie group of diffeomorphisms preserving the connection. From the infinitesimal point of view, this representation is determined by the 1-connection form and the fundamental form of the bundle of linear frames of the manifold. We show that the group of affine transformations of a real flat affine -dimensional manifold, acts on leaving an open orbit when its dimension is greater than . Moreover, when the dimension of the group of affine transformations is , this orbit has discrete isotropy. For any given Lie subgroup of affine transformations of the manifold, we show the existence of an associative envelope of the Lie algebra of , relative to the connection. The case when is a Lie group and acts on by left translations is particularly interesting. We also exhibit some results about flat affine manifolds whose group of affine transformations admits a flat affine bi-invariant structure. The paper is illustrated with several examples.
Cite
@article{arxiv.1910.04238,
title = {Flat Affine Manifolds And Their Transformations},
author = {A. Medina and O. Saldarriaga and A. Villabon},
journal= {arXiv preprint arXiv:1910.04238},
year = {2020}
}
Comments
More references have been added. In particular, the reference to Jack Vey's thesis. We have corrected some typos and included some other changes. arXiv admin note: text overlap with arXiv:1707.07030