The strong Borel--Cantelli property in conventional and nonconventional setups

Abstract

We study the strong Borel-Cantelli property both for events and for shifts on sequence spaces considering both a conventional and a nonconventional setups. Namely, under certain conditions on events 1,2,... we show that with probability one \[ (Σn=1NΠi=1 P(qi(n)))-1Σn=1NΠi=1_qi(n) 1\,\,as\,\, N∞ \] where qi(n),\, i=1,..., are integer valued functions satisfying certain assumptions and I denotes the indicator of . When =1 (called the conventional setup) this convergence can be established under φ-mixing conditions while when >1 (called a nonconventional setup) the stronger -mixing condition is required. These results are extended to shifts T of sequence spaces where qi(n) is replaced by T-qi(n)Cn(i) where Cn(i),\, i=1,...,,\, n≥ 1 is a sequence of cylinder sets. As an application we study the asymptotical behavior of maximums of certain logarithmic distance functions and of (multiple) hitting times of shrinking cylinders.