Automatic sequences are orthogonal to aperiodic multiplicative functions

Abstract

Given a finite alphabet A and a primitive substitution θ:Aλ (of constant length λ), let (Xθ,S) denote the corresponding dynamical system, where Xθ is the closure of the orbit via the left shift S of a fixed point of the natural extension of θ to a self-map of AZ. The main result of the paper is that all continuous observables in Xθ are orthogonal to any bounded, aperiodic, multiplicative function u:N, i.e. \[ N∞1NΣn≤ Nf(Snx)u(n)=0\] for all f∈ C(Xθ) and x∈ Xθ. In particular, each primitive automatic sequence, that is, a sequence read by a primitive finite automaton, is orthogonal to any bounded, aperiodic, multiplicative function.