A strictly ergodic, positive entropy subshift uniformly uncorrelated to the Moebius function

Abstract

A recent result of Downarowicz and Serafin (DS) shows that there exist positive entropy subshifts satisfying the assertion of Sarnak's conjecture. More precisely, it is proved that if y=(yn)n 1 is a bounded sequence with zero average along every infinite arithmetic progression (the M\"obius function is an example of such a \ y) then for every N 2 there exists a subshift over N symbols, with entropy arbitrarily close to N, uncorrelated to y. In the present note, we improve the result of (DS). First of all, we observe that the uncorrelation obtained in (DS) is uniform, i.e., for any continuous function f: R and every ε>0 there exists n0 such that for any n n0 and any x∈ we have |1nΣi=1nf(Tix)\,yi|<ε. More importantly, by a fine-tuned modification of the construction from (DS) we create a strictly ergodic subshift, with all the desired properties of the example in (DS) (uniformly uncorrelated to y and with entropy arbitrarily close to N). The question about these two additional properties (uniformity of uncorrelation and strict ergodicity) has been posed by Mariusz Lemanczyk in the context of the so-called strong MOMO (M\"obius Orthogonality on Moving Orbits) property. Our result shows, among other things, that strong MOMO is essentially stronger than uniform uncorrelation, even for strictly ergodic systems.