The smoothness of the real projective deformation spaces of orderable Coxeter 3-polytopes
Abstract
A Coxeter polytope is a convex polytope in a real projective space equipped with linear reflections in its facets, such that the orbits of the polytope under the action of the group generated by the linear reflections tessellate a convex domain in the real projective space. Vinberg proved that the group generated by these reflections acts properly discontinuously on the interior of the convex domain, thus inducing a natural orbifold structure on the polytope. In this paper, we consider labeled combinatorial polytopes G associated to such orbifolds, and study the deformation space C (G) of Coxeter polytopes realizing G. We prove that if G is orderable and of normal type then the deformation space C(G) of real projective Coxeter 3-polytopes realizing G is a smooth manifold. This result is achieved by analyzing a natural map of C (G) into a smooth manifold called the realization space.
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