Borel-Cantelli sequences

Abstract

A sequence \xn\1∞ in [0,1) is called Borel-Cantelli (BC) if for all non-increasing sequences of positive real numbers \an\ with i=1∞Σai=∞ the set \[k=1∞ n=k∞ B(xn, an))=\x∈[0,1) |xn-x|<an for ∞ manyn≥1\\] has full Lebesgue measure. (To put it informally, BC sequences are sequences for which a natural converse to the Borel-Cantelli Theorem holds). The notion of BC sequences is motivated by the Monotone Shrinking Target Property for dynamical systems, but our approach is from a geometric rather than dynamical perspective. A sufficient condition, a necessary condition and a necessary and sufficient condition for a sequence to be BC are established. A number of examples of BC and not BC sequences are presented. The property of a sequence to be BC is a delicate diophantine property. For example, the orbits of a pseudo-Anosoff IET (interval exchange transformation) are BC while the orbits of a "generic" IET are not. The notion of BC sequences is extended to more general spaces.