On the existence of numbers with matching continued fraction and decimal expansions

Abstract

A Trott number is a number x∈(0,1) whose continued fraction expansion is equal to its base b expansion for a given base b, in the following sense: If x=[0;a1,a2,…], then x=(0.a1a2…)b, where ai is the string of digits resulting from writing ai in base b. In this paper we characterize the set of bases for which Trott numbers exist, and show that for these bases, the set Tb of Trott numbers is a complete Gδ set. We prove moreover that the union T:=b≥ 2 Tb is nowhere dense and has Hausdorff dimension less than one. Finally, we give several sufficient conditions on bases b and b' such that Tb Tb'=, and conjecture that this is the case for all b≠ b'. This question has connections with some deep theorems in Diophantine approximation.