A quantitative version of the Steinhaus theorem

Abstract

The classical Steinhaus theorem (Steinhaus1920) says that if A ⊂ Rd has positive Lebesgue measure than A-A=\x-y: x,y ∈ A\ contains an open ball. We obtain some quantitative lower bounds on the size of this ball and in some cases, relate it to natural geometric properties of ∂ A. We also study the process Kn =12(Kn-1 - Kn-1) when K0 is a compact subset of Rd and determine various aspects of its convergence to Conv(K1), the convex hull of K1. We discuss some connections with convex geometry, Weyl tube formula and the Kakeya needle problem. Keywords: Measure theory, Steinhaus theorem, Convex geometry, Weyl tube formula. 2020 Mathematics Subject Classification: Primary: 28A75, 52A27. Secondary: 52A30, 53A07.