M\"obius orthogonality in density for zero entropy dynamical systems
Abstract
It is proved that whenever a zero entropy dynamical system (X,T) has only countably many ergodic measures and μ stands for the arithmetic M\"obius function, then there exists a subset A of integers depending only on the system, of logarithmic density one, such that for each f continuous on X, 1N Σn≤ N f(Tnx)μ(n) 0 as N∞, N∈ A, uniformly in x∈ X. In particular, the density version of M\"obius orthogonality holds.
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