Exact approximation order of real numbers in Cantor series expansions

Abstract

Let Q = \qn\n 1 be a sequence of integers with qn 2 for all n ∈N. For any real number x ∈ [0,1), it can be expanded into the following infinite series: x =1(x)q1+ 2(x)q1 q2+ ·s+ n(x)q1 q2 ·s qn+ ·s, which is called the Cantor series expansion of x. We introduce the exact spproximation order in Cantor series expansions. It is analogous to the notion appearing in classical Diophantine approximation. More precisely, let ωn(x) denote the n-th partial sum of the Cantor series expansion of x. For any monotonic function ψ, we study the metric theory of the set Ec(ψ) of points that are exactly ψ-approximable by ωn(x).