Equidistribution of sparse sequences on nilmanifolds

Abstract

We study equidistribution properties of nil-orbits (bnx)n∈ when the parameter n is restricted to the range of some sparse sequence that is not necessarily polynomial. For example, we show that if X=G/ is a nilmanifold, b∈ G is an ergodic nilrotation, and c∈ is positive, then the sequence (b[nc]x)n∈ is equidistributed in X for every x∈ X. This is also the case when nc is replaced with a(n), where a(t) is a function that belongs to some Hardy field, has polynomial growth, and stays logarithmically away from polynomials, and when it is replaced with a random sequence of integers with sub-exponential growth. Similar results have been established by Boshernitzan when X is the circle.