M\"obius disjointness conjecture for Furstenberg's flow on Tω in short intervals

Abstract

Furstenberg's flow on the infinite-dimensional torus Tω is defined by \[ T (x1, x2, …, x, …) = (x1 + α, x2 + h(x1), …, x + h(x1 + (-2)β), …) \] with α∈ R satisfying certain diophantine conditions, β∈ R, and h: R R being 1-periodic and analytic. This flow is irregular in the sense that its Birkhoff average does not exist for some x∈ Tω, and it is a generalization of Furstenberg's irregular flow on T2. The main result of this paper is that the M\"obius Disjointness Conjecture of Sarnak holds for the above flow (Tω, T) in short intervals (N-M, N] with N5/8+ ≤slant M≤slant N.