Symmetrizations of Ball-Bodies

Abstract

We study symmetrization procedures within the class Sn of ball-bodies, i.e.\ intersections of unit Euclidean balls (equivalently, summands of the Euclidean unit ball, or c-convex sets via the c-duality A Ac). We first examine linear parameter systems obtained by replacing the usual convex hull by the c-hull Acc, deriving consequences for volume along these c-paths. In particular, we obtain convexity statements in special cases and in dimension 2, and we show by example that such convexity fails in general for n 3. We then focus on Steiner symmetrization. We prove that Steiner symmetrization increases the dual volume and that in the planar case Steiner symmetrals of ball-bodies remain ball-bodies. In contrast, we provide an explicit example in 3 showing that the Steiner symmetral of a ball-body need not belong to Sn, and show that there are such counter-examples with arbitrarily large curvatures.