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paper

Decay of correlation for expanding toral endomorphisms

arXiv:1511.06868

Abstract

Let $A$ be an expanding endomorphism on the torus ${\Bbb T}^d = {\Bbb R}^d /{\Bbb Z}^d$ with its smallest eigenvalue $λ>1$. Consider the ergodic system $({\Bbb T}^d, A, μ)$ where $μ$ is Haar measure. We prove that the correlation $ρ_{f, g}(n)$ of a pair of functions $f, g \in L^2(μ)$ is controlled by the modulus of $L^2$-continuity $Ω_{f, 2}(λ^{-n})$ and that the estimate is to some extent optimal. We also prove the central limit theorem for the stationary process $f(A^n x)$ defined by a function $f$ satisfying $Σ_n Ω_{f,2}(λ^{-n}) <\infty$. An application is given to the Ulam-von Neumann system.