Descriptive complexity in Cantor series

Abstract

A Cantor series expansion for a real number x with respect to a basic sequence Q=(q1,q2,…), where qi ≥ 2, is a representation of the form x=a0 + Σi=1∞ aiq1q2·s qi where 0 ≤ ai<qi. These generalize ordinary base b expansions where qi=b. Ki and Linton showed that for ordinary base b expansions the set of normal numbers is a 03-complete set, establishing the exact complexity of this set. In the case of Cantor series there are three natural notions of normality: normality, ratio normality,and distribution normality (these notions are equivalent for base b expansions). We show that for any Q the set DN(Q) of distribution normal number is 03-complete, and if Q is 1-divergent (i.e., Σi=1∞ 1qi diverges) then the sets N(Q) and RN(Q) of normal and ratio normal numbers are 03-complete. We further show that all five non-trivial differences of these sets are D2(03)-complete if i qi=∞ and Q is 1-divergent (the trivial case is N(Q) RN(Q)=). This shows that except for the containment N(Q)⊂eq RN(Q), these three notions are as independent as possible.