On the Origin of Crystallinity: a Lower Bound for the Regularity Radius of Delone Sets

Abstract

The local theory of regular or multi-regular systems aims at finding sufficient local conditions for a Delone set X to be a regular or multi-regular system. One of the main goals is to estimate the regularity radius d for Delone sets X in terms of the radius R of the largest "empty ball" for X. The present paper establishes the lower bound d≥ 2dR for all d, which is linear in d. The best previously known lower bound had been d≥ 4R for d≥ 2. The proof of the new lower bound is accomplished through explicit constructions of Delone sets with mutually equivalent (2dR-)-clusters, which are not regular systems.