Higher Order Oscillating Sequences, Affine Distal Flows on the d-Torus, and Sarnak's Conjecture

Abstract

In this paper, we give two precise definitions of a higher order oscillating sequence and show the importance of this concept in the study of Sarnak's conjecture. We prove that any higher order oscillating sequence of order d is linearly disjoint from all affine distal flows on the d-torus for all d≥ 2. One consequence of this result is that any higher order oscillating sequence of order 2 is linearly disjoint from all affine flows on the 2-torus with zero topological entropy. In particular, this reconfirms Sarnak's conjecture for all affine flows on the 2-torus with zero topological entropy and for all affine distal flows on the d-torus for all d≥ 2.