Entropy of convolutions on the circle

Abstract

Given ergodic p-invariant measures μi on the 1-torus T=R/Z, we give a sharp condition on their entropies, guaranteeing that the entropy of the convolution μon converges to p. We also prove a variant of this result for joinings of full entropy on . In conjunction with a method of Host, this yields the following. Denote q(x) = qx1. Then for every p-invariant ergodic μ with positive entropy, 1NΣn=0N-1cnμ converges weak* to Lebesgue measure as N ∞, under a certain mild combinatorial condition on ck. (For instance, the condition is satisfied if p=10 and ck=2k+6k or ck=22k.) This extends a result of Johnson and Rudolph, who considered the sequence ck = qk when p and q are multiplicatively independent. We also obtain the following corollary concerning Hausdorff dimension of sum sets: For any sequence Si of p-invariant closed subsets of T, if Σ H(Si) / |H(Si)| = ∞, then H(S1 + ·s + Sn) 1.

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