Volume of the Minkowski sums of star-shaped sets

Abstract

For a compact set A ⊂ Rd and an integer k 1, let us denote by A[k] = \a1+·s +ak: a1, …, ak∈ A\=Σi=1k A the Minkowski sum of k copies of A. A theorem of Shapley, Folkmann and Starr (1969) states that 1kA[k] converges to the convex hull of A in Hausdorff distance as k tends to infinity. Bobkov, Madiman and Wang (2011) conjectured that the volume of 1kA[k] is non-decreasing in k, or in other words, in terms of the volume deficit between the convex hull of A and 1kA[k], this convergence is monotone. It was proved by Fradelizi, Madiman, Marsiglietti and Zvavitch (2016) that this conjecture holds true if d=1 but fails for any d ≥ 12. In this paper we show that the conjecture is true for any star-shaped set A ⊂ Rd for d=2 and d=3 and also for arbitrary dimensions d 4 under the condition k (d-1)(d-2). In addition, we investigate the conjecture for connected sets and present a counterexample to a generalization of the conjecture to the Minkowski sum of possibly distinct sets in Rd, for any d ≥ 7.