Itai Benjamini, Ronen Eldan
Published 2011-05-30, updated 2011-06-02Version 2
We show that there exists a universal constant C>0 such that the convex hull of any N points in the hyperbolic space H^n is of volume smaller than C N, and that for any dimension n there exists a constant C_n > 0 such that for any subset A of H^n, Vol(Conv(A_1)) < C_n Vol(A_1) where A_1 is the set of points of hyperbolic distance to A smaller than 1.
Comments: 7 pages
Journal: Geometriae Dedicata, Volume 160, Issue 1 , pp 365-371 (2012)
Projection theorems in hyperbolic space
Prescribing The Gauss Curvature Of Convex Bodies In Hyperbolic Space
Hyperbolic $p$-sum and Horospherical $p$-Brunn-Minkowski theory in hyperbolic space
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