Maximal perimeters of polytope sections and origin-symmetry

Abstract

Let P⊂Rn (n≥ 3) be a convex polytope containing the origin in its interior. Let voln-2 ( relbd ( P t + ) ) denote the (n-2)-dimensional volume of the relative boundary of P t + for t∈R, ∈ Sn-1. We prove the following: if align* voln-2 ( relbd ( P ) ) = t∈R voln-2 ( relbd ( P t + ) ) \ \ ∀ \ \ ∈ Sn-1, align* then P is origin-symmetric, i.e. P = -P. Our result gives a partial affirmative answer to a conjecture by Makai, Martini, and \'Odor. We also characterize the origin-symmetry of C1 convex bodies in terms of the dual quermassintegrals of their sections; this can be seen as a dual version of the conjecture of Makai et al.