Nikolay Bogachev, Dmitry Guschin, Andrei Vesnin
Published 2023-07-13Version 1
In this paper we provide a generalized construction of nonarithmetic hyperbolic orbiifolds in the spirit of Gromov and Piatetski-Shapiro. Nonarithmeticity of such orbifolds is based on recently obtained results connecting a behaviour of the so-called fc-subspaces (totally geodesic subspaces fixed by finite order elements of the commensurator) with arithmetic properties of hyperbolic orbifolds and manifolds. As an application, we verify arithmeticity of some particular class of ideal hyperbolic right-angled $3$-polyhedra and hyperbolic link complements.
Comments: 7 pages, 3 figures
Totally geodesic hyperbolic 3-manifolds in hyperbolic link complements of tori in $S^4$
Bipyramids and bounds on volumes of hyperbolic links
Geodesic Bounds of Hyperbolic Link Complements in Hyperbolic $3$-Manifold
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