Measures supported on partly normal numbers

Abstract

A real number x is normal with respect to an integer base b ≥ 2 if its digit expansion in this base is ``equitable'', in the sense that for k ≥ 1, every ordered sequence of k digits from \0, 1, …, b-1\ occurs in the digit expansion of x with the same limiting frequency. Borel's classical result b09 asserts that Lebesgue-almost every number x is normal in every base b ≥ 2. This three-part article considers sets of partial normality. Given any choice of integer bases B, B' ⊂eq \2, 3, …\, we investigate measure-theoretic properties of the set N(B, B'), whose members are, by definition, normal in the bases of B and non-normal in the bases of B'. A pair of sets (B, B') is compatible if any (b, b') ∈ B × B' is multiplicatively independent. For compatible (B, B') with B' , we construct singular probability measures supported on N(B, B') that are both Frostman and Rajchman, extending prior work of Pollington p81 and Lyons l86. The Rajchman property completely answers a question of Kahane and Salem Kahane-Salem-64, identifying N(B, B') as a set of multiplicity (in the Fourier-analytic sense) if and only if (B, B') is compatible. The methodological contribution of the article is the construction of a class of probability measures called skewed measures. These measures depend on a number of parameters that can be independently adjusted to ensure (subsets of) properties such as almost everywhere normality, non-normality, ball conditions and Fourier decay.