The quantitative behaviour of polynomial orbits on nilmanifolds

Abstract

A theorem of Leibman asserts that a polynomial orbit (g(1),g(2),g(3),…) on a nilmanifold G/ is always equidistributed in a union of closed sub-nilmanifolds of G/. In this paper we give a quantitative version of Leibman's result, describing the uniform distribution properties of a finite polynomial orbit (g(1),…,g(N)) in a nilmanifold. More specifically we show that there is a factorization g = ε g'γ, where ε(n) is "smooth", γ(n) is periodic and "rational", and (g'(a),g'(a+d),…,g'(a + d(l-1))) is uniformly distributed (up to a specified error δ) inside some subnilmanifold G'/' of G/, for all sufficiently dense arithmetic progressions a,a+d,…,a+d(l-1) inside \1,..,N\. Our bounds are uniform in N and are polynomial in the error tolerance delta. In a subsequent paper we shall use this theorem to establish the Mobius and Nilsequences conjecture from our earlier paper "Linear equations in primes".