Two-sided bounds for the volume of right-angled hyperbolic polyhedra

Abstract

For a compact right-angled polyhedron R in H3 denote by vol (R) the volume and by vert (R) the number of vertices. Upper and lower bounds for vol (R) in terms of vert (R) were obtained in A09. Constructing a 2-parameter family of polyhedra, we show that the asymptotic upper bound 5 v3 / 8, where v3 is the volume of the ideal regular tetrahedron in H3, is a double limit point for ratios vol (R) / vert (R). Moreover, we improve the lower bound in the case vert (R) ≤slant 56.