The M \"obius Disjointness Conjecture on infinite-dimensional torus

Abstract

Let Tω be the infinite-dimensional torus, and T: Tω Tω be defined by \[ T: (x1, x2, …, xk, …) (x1 + α, x2 + h(x1), …, xk + h(x1 + (k-2)β), …) \] with α∈ R, β∈ R, and h: R R being 1-period and C1+-smooth. This flow (Tω, T) is distal, and is also irregular in the sense that its Birkhoff average does not exist for all x∈ Tω. The main result of this paper is that the M \"obius Disjointness Conjecture of Sarnak holds for (Tω, T).

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