Approximate orthogonality of powers for ergodic affine unipotent diffeomorphisms on nilmanifolds

Abstract

Let G be a connected, simply connected nilpotent Lie group and < G a lattice. We prove that each ergodic diffeomorphism φ(x)=uA(x) on the nilmanifold G/ , where u∈ G and A:G G is a unipotent automorphism satisfying A()= , enjoys the property of asymptotically orthogonal powers (AOP). Two consequences follow: (i) Sarnak's conjecture on M\"obius orthogonality holds in every uniquely ergodic model of an ergodic affine unipotent diffeomorphism; (ii) For ergodic affine unipotent diffeomorphisms themselves, the M\"obius orthogonality holds on so called typical short interval: 1 MΣM≤ m<2M|1HΣm≤ n<m+H f(φn(x))μ (n)| 0 as H∞ and H/M0 for each x∈ G/ and each f∈ C(G/) . In particular, the results in (i) and (ii) hold for ergodic nil-translations. Moreover, we prove that each nilsequence is orthogonal to the M\"obius function μ on a typical short interval. We also study the problem of lifting of the AOP property to induced actions and derive some applications on uniform distribution.