On the diminishing process of B. T\'oth

Abstract

Let K and K0 be convex bodies in Rd, such that K contains the origin, and define the process (Kn, pn), n ≥ 0, as follows: let pn+1 be a uniform random point in Kn, and set Kn+1 = Kn (pn+1 + K). Clearly, (Kn) is a nested sequence of convex bodies which converge to a non-empty limit object, again a convex body in Rd. We study this process for K being a regular simplex, a cube, or a regular convex polygon with an odd number of vertices. We also derive some new results in one dimension for non-uniform distributions.