Limit theorems for numbers of returns in arrays under φ-mixing

Abstract

We consider a φ-mixing shift T on a sequence space and study the number N of returns \ TqN(n)∈ Aan\ at times qN(n) to a cylinder Aan constructed by a sequence a∈ where n runs either until a fixed integer N or until a time τN of the first return \ TqN(n)∈ Abm\ to another cylinder Abm constructed by b∈. Here qN(n) are certain functions of n taking on nonnegative integer values when n runs from 0 to N and the dependence on N is the main generalization here which requires certain conditions under which we obtain Poisson distributions limits of N when counting is until N as N∞ and geometric distributions limits when counting is until τN as N∞.