Multiple ergodic averages along functions from a Hardy field: convergence, recurrence and combinatorial applications

Abstract

We obtain new results pertaining to convergence and recurrence of multiple ergodic averages along functions from a Hardy field. Among other things, we confirm some of the conjectures posed by Frantzikinakis in [Fra10; Fra16] and obtain combinatorial applications which contain, as rather special cases, several previously known (polynomial and non-polynomial) extensions of Szemeredi's theorem on arithmetic progressions [BL96; BLL08; FW09; Fra10; BMR17]. One of the novel features of our results, which is not present in previous work, is that they allow for a mixture of polynomials and non-polynomial functions. As an illustration, assume fi(t)=ai,1tci,1+·s+ai,dtci,d for ci,j>0 and ai,j∈R. Then for any measure preserving system (X,B,μ,T) and h1,…,hk∈ L∞(X), the limit N∞1NΣn=1N T[f1(n)]h1·s T[fk(n)]hk exists in L2; for any E⊂ N with d(E)>0 there are a,n∈N such that \a,\, a+[f1(n)],…,a+[fk(n)]\⊂ E. We also show that if f1,…,fk belong to a Hardy field, have polynomial growth, and are such that no linear combination of them is a polynomial, then for any measure preserving system (X, B,μ,T) and any A∈ B, N∞1NΣn=1Nμ(A T-[ f1(n) ]A… T-[fk(n)]A)\,≥\,μ(A)k+1.