Single and multiple recurrence along non-polynomial sequences

Abstract

We establish new recurrence and multiple recurrence results for a rather large family F of non-polynomial functions which includes tempered functions defined in [11], as well as functions from a Hardy field with the property that for some ∈ N\0\, x∞ f()(x)=∞ and x∞ f(+1)(x)=0. Among other things, we show that for any f∈F, any invertible probability measure preserving system (X,B,μ,T), any A∈B with μ(A)>0, and any ε>0, the sets of returns Rε, A= \n∈N:μ(A T- f(n)A)>μ2(A)-ε\ and R(k)A= \ n∈N: μ(A T f(n)A T f(n+1)A·s T f(n+k)A)>0\ possess somewhat unexpected properties of largeness; in particular, they are thick, i.e., contain arbitrarily long intervals.