Joint ergodicity of Hardy field sequences

Abstract

We study mean convergence of multiple ergodic averages, where the iterates arise from smooth functions of polynomial growth that belong to a Hardy field. Our results include all logarithmico-exponential functions of polynomial growth, such as the functions t3/2, t t and e t. We show that if all non-trivial linear combinations of the functions a1,...,ak stay logarithmically away from rational polynomials, then the L2-limit of the ergodic averages 1N Σn=1Nf1(Ta1(n)x)·s fk(Tak(n)x) exists and is equal to the product of the integrals of the functions f1,...,fk in ergodic systems, which establishes a conjecture of Frantzikinakis. Under some more general conditions on the functions a1,...,ak, we also find characteristic factors for convergence of the above averages and deduce a convergence result for weak-mixing systems.