Limit theorems for numbers of multiple returns in nonconventional arrays

Abstract

For a -mixing process 0,1,2,... we consider the number NN of multiple returns \qi,N(n)∈N,\, i=1,...,\ to a set N for n until either a fixed number N or until the moment τN when another multiple return \qi,N(n)∈N,\, i=1,...,\ takes place for the first time where NN= and qi,N,\, i=1,..., are certain functions of n taking on nonnegative integer values when n runs from 0 to N. The dependence of qi,N(n)'s on both n and N is the main novelty of the paper. Under some restrictions on the functions qi,N we obtain Poisson distributions limits of NN when counting is until N as N∞ and geometric distributions limits when counting is until τN as N∞. We obtain also similar results in the dynamical systems setup considering a -mixing shift T on a sequence space and studying the number of multiple returns \ Tqi,N(n)ω∈ Aan,\, i=1,...,\ until the first occurrence of another multiple return \ Tqi,N(n)ω∈ Abm,\, i=1,...,\ where Aan,\, Amb are cylinder sets of length n and m constructed by sequences a,b∈, respectively, and chosen so that their probabilities have the same order.