Hyperbolic Simplices of Maximal Inradius

Abstract

For n∈ N, consider a hyperbolic n-dimensional simplex , defined by 1+n points in the compactified hyperbolic space Hn ∂ Hn. For each integer m n, denote δnm()∈ [0,+∞] the Hausdorff distance between its skeleta of dimensions n and m. In particular, δnn-1() is its inradius. The maximum of δnm() over ∈ (Hn ∂ Hn)1+n is denoted μnm∈ [0,+∞]. We first show that has maximal inradius δnn-1()=μnm if and only if its is (total) ideal and regular; for which the inradius is given by μnn-1 = 1/n. We deduce that has maximal δnn-1()=μnm if and only if it is (total) ideal and regular. We compute that the maximal distance to the 1-skeleton μn1 is given by ( μn1)2 = (n-1)/(2n) and deduce that those are uniformly bounded by n μn1 = (1+2).

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