Pointwise convergence in nilmanifolds along smooth functions of polynomial growth

Abstract

We study the equidistribution of orbits of the form b1a1(n)... bkak(n) in a nilmanifold X, where the sequences ai(n) arise from smooth functions of polynomial growth belonging to a Hardy field. We show that under certain assumptions on the growth rates of the functions a1,...,ak, these orbits are uniformly distributed on some subnilmanifold of the space X. As an application of these results and in combination with the Host-Kra structure theorem for measure preserving systems, as well as some recent seminorm estimates of the author for ergodic averages concerning Hardy field functions, we deduce a norm convergence result for multiple ergodic averages. Our method mainly relies on an equidistribution result of Green-Tao on finite polynomial orbits of a nilmanifold.