The number of cusps of right-angled polyhedra in hyperbolic spaces
Abstract
As was pointed out by Nikulin [8] and Vinberg [10], a right-angled polyhedron of finite volume in hyperbolic n-space Hn has at least one cusp for n≥ 5. We obtain non-trivial lower bounds on the number of cusps of such polyhedra. For example, right-angled polyhedra of finite volume must have at least three cusps for n=6. Our theorem also says that the higher the dimension of a right-angled polyhedron becomes, the more cusps it must have.
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