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Classification of \((1{,}2)\)-reflective anisotropic hyperbolic lattices of rank \(4\)

By Nikolay Bogachev
A hyperbolic lattice is called $(1{,2)\(-reflective} if its automorphism group is generated by \)1\(- and \)2\(-reflections up to finite index. In this paper we prove that the fundamental polyhedron of a \)\mathbb{Q}$-arithmetic cocompact reflection group in the three-dimensional Lobachevsky space contains an edge such that the distance between its framing... Show more
March 18, 2019
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Classification of $(1{,}2)$-reflective anisotropic hyperbolic lattices of rank $4$
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