Some hyperbolic three-manifolds that bound geometrically
Abstract
A closed connected hyperbolic -manifold bounds geometrically if it is isometric to the geodesic boundary of a compact hyperbolic -manifold. A. Reid and D. Long have shown by arithmetic methods the existence of infinitely many manifolds that bound geometrically in every dimension. We construct here infinitely many explicit examples in dimension using right-angled dodecahedra and -cells and a simple colouring technique introduced by M. Davis and T. Januszkiewicz. Namely, for every , we build an orientable compact closed -manifold tessellated by right-angled dodecahedra that bounds a -manifold tessellated by right-angled -cells. A notable feature of this family is that the ratio between the volumes of the -manifolds and their boundary components is constant and, in particular, bounded.
Cite
@article{arxiv.1311.2993,
title = {Some hyperbolic three-manifolds that bound geometrically},
author = {Alexander Kolpakov and Bruno Martelli and Steven T. Tschantz},
journal= {arXiv preprint arXiv:1311.2993},
year = {2020}
}
Comments
10 pages, 1 figure; ancillary Wolfram Mathematica notebook available at https://doi.org/10.7910/DVN/A6XZLC