M\"obius disjointness for models of an ergodic system and beyond

Abstract

Given a topological dynamical system (X,T) and an arithmetic function u, we study the strong MOMO property (relatively to u) which is a strong version of u-disjointness with all observable sequences in (X,T). It is proved that, given an ergodic measure-preserving system (Z,D,,R), the strong MOMO property (relatively to u) of a uniquely ergodic model (X,T) of R yields all other uniquely ergodic models of R to be u-disjoint. It follows that all uniquely ergodic models of: ergodic unipotent diffeomorphisms on nilmanifolds, discrete spectrum automorphisms, systems given by some substitutions of constant length (including the classical Thue-Morse and Rudin-Shapiro substitutions), systems determined by Kakutani sequences are M\"obius (and Liouville) disjoint. The validity of Sarnak's conjecture implies the strong MOMO property relatively to μ in all zero entropy systems, in particular, it makes μ-disjointness uniform. The absence of strong MOMO property in positive entropy systems is discussed and, it is proved that, under the Chowla conjecture, a topological system has the strong MOMO property relatively to the Liouville function if and only if its topological entropy is zero.