Arbitrarily slow decay in the M\"obius disjointness conjecture
Abstract
Sarnak's M\"obius disjointness conjecture asserts that for any zero entropy dynamical system (X,T), 1N Σn=1 N f(Tn x) μ (n)= o(1) for every f∈ C(X) and every x∈ X. We construct examples showing that this o(1) can go to zero arbitrarily slowly. In fact, our methods yield a more general result, where in lieu of μ(n) one can put any bounded sequence such that the Ces\`aro mean of the corresponding sequence of absolute values does not tend to zero.
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