Metrical theory of power-2-decaying Gauss-like expansion

Abstract

Each x∈ (0,1] can be uniquely expanded as a power-2-decaying Gauss-like expansion, in the form of equation* x=Σi=1∞2-(d1(x)+d2(x)+·s+di(x)), di(x)∈ N. equation* Let φ:N R+ be an arbitrary positive function. We are interested in the size of the set F(φ)=\x∈ (0,1]:dn(x) φ(n)~~for infinity many~n\. We prove a Borel-Bernstein theorem on the zero-one law of the Lebesgue measure of F(φ). When the Lebesgue measure of F(φ) is zero, we calculate its Hausdorff dimension. Furthermore, we analyse the growth rate of the maximal digit among the first n digits from probability and multifractal perspectives.