On the speed of convergence in the strong density theorem

Abstract

For a compact set K⊂ Rm, we have two indexes given under simple parameters of the set K (these parameters go back to Besicovitch and Taylor in the late 50's). In the present paper we prove that with the exception of a single extreme value for each index, we have the following elementary estimate on how fast the ratio in the strong density theorem of Saks will tend to one \[ |R K||R|>1-o(1| d(R)|) for a.e. \ \ x∈ K \ \ and for \ \ d(R) 0 \] (provided x∈ R, where R is an interval in Rm, d stands for the diameter and |·| is the Lebesgue measure). This work is a natural sequence of [3] and constitutes a contribution to Problem 146 of Ulam [5, p. 245] (see also [8, p.78]) and Erd\"os' Scottish Book `Problems' [5, Chapter 4, pp. 27-33], since it is known that no general statement can be made on how fast the density will tend to one.