Geometric structures on orbifolds and holonomy representations
Geometric Topology
2007-05-23 v2 Group Theory
Rings and Algebras
Abstract
An orbifold is a topological space modeled on quotient spaces of a finite group actions. We can define the universal cover of an orbifold and the fundamental group as the deck transformation group. Let be a Lie group acting on a space . We show that the space of isotopy-equivalence classes of -structures on a compact orbifold is locally homeomorphic to the space of representations of the orbifold fundamental group of to following the work of Thurston, Morgan, and Lok. This implies that the deformation space of -structures on is locally homeomorphic to the space of representations of the orbifold fundamental group to when restricted to the region of proper conjugation action by .
Cite
@article{arxiv.math/0107172,
title = {Geometric structures on orbifolds and holonomy representations},
author = {Suhyoung Choi},
journal= {arXiv preprint arXiv:math/0107172},
year = {2007}
}
Comments
35 pages