Width of convex bodies in hyperbolic space

Abstract

For every hyperplane H supporting a convex body C in the hyperbolic space Hd we define the width of C determined by H as the distance between H and a most distant ultraparallel hyperplane supporting C. We prove that if H (C) = (C) and if there exists a unique most distant point j ∈ C from H, then the projection of j onto H belongs to H C. We verify that the diameter of C equals to the maximum width of C. We define bodies of constant width in Hd in the standard way as bodies whose all widths are equal. We show that every body of constant width is strictly convex. The minimum width of C over all supporting H is called the thickness (C) of C. A convex body R ⊂ Hd is said to be reduced if (Z) < (R) for every convex body Z properly contained in R. We show that regular tetrahedra in H3 are not reduced. Similarly as in the Euclidean and spherical spaces, we introduce complete bodies and bodies of constant diameter in Hd. We show that every body of constant width δ is a body of constant diameter δ and a complete body of diameter δ. Moreover, the two last conditions are equivalent.