Minimizing the mean projections of finite -separable packings

Abstract

A packing of translates of a convex body in the d-dimensional Euclidean space Ed is said to be totally separable if any two packing elements can be separated by a hyperplane of Ed disjoint from the interior of every packing element. We call the packing P of translates of a centrally symmetric convex body C in Ed a -separable packing for given ≥ 1 if in every ball concentric to a packing element of P having radius (measured in the norm generated by C) the corresponding sub-packing of P is totally separable. The main result of this paper is the following theorem. Consider the convex hull Q of n non-overlapping translates of an arbitrary centrally symmetric convex body C forming a -separable packing in Ed with n being sufficiently large for given ≥ 1. If Q has minimal mean i-dimensional projection for given i with 1≤ i<d, then Q is approximately a d-dimensional ball. This extends a theorem of K. B\"or\"oczky Jr. [Monatsh. Math. 118 (1994), 41-54] from translative packings to -separable translative packings for ≥ 1.