× a and × b empirical measures, the irregular set and entropy

Abstract

For integers a and b≥ 2, let Ta and Tb be multiplication by a and b on T=R/Z. The action on T by Ta and Tb is called × a,× b action and it is known that, if a and b are multiplicatively independent, then the only × a,× b invariant and ergodic measure with positive entropy of Ta or Tb is the Lebesgue measure. However, whether there exists a nontrivial × a,× b invariant and ergodic measure is not known. In this paper, we study the empirical measures of x∈T with respect to the × a,× b action and show that the set of x such that the empirical measures of x do not converge to any measure has Hausdorff dimension 1 and the set of x such that the empirical measures can approach a nontrivial × a,× b invariant measure has Hausdorff dimension zero. Furthermore, we obtain some equidistribution result about the × a,× b orbit of x in the complement of a set of Hausdorff dimension zero.

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