English

On Normality and Equidistribution for Separator Enumerators

Formal Languages and Automata Theory 2026-02-04 v2

Abstract

A separator is a countable dense subset of [0,1)[0,1), and a separator enumerator is a naming scheme that assigns a real number in [0,1)[0,1) to each finite word so that the set of all named values is a separator. Mayordomo introduced separator enumerators to define ff-normality and a relativized finite-state dimension dimFSf(x)\dim^{f}_{\mathrm{FS}}(x), where finite-state dimension measures the asymptotic lower rate of finite-state information needed to approximate xx through its ff-names. This framework extends classical base-kk normality, and Mayordomo showed that it supports a point-to-set principle for finite-state dimension. This representation-based viewpoint has since been developed further in follow-up work, including by Calvert et al., yielding strengthened randomness notions such as supernormal and highly normal numbers. Mayordomo posed the following open question: can ff-normality be characterized via equidistribution properties of the sequence (Σnanf(x))n=0\left(|\Sigma|^{n} a^{f}_{n}(x)\right)_{n=0}^{\infty}, where anf(x)a^{f}_{n}(x) is the sequence of best approximations to xx from below induced by ff? We give a strong negative answer: we construct computable separator enumerators f0,f1f_0,f_1 and a point xx such that anf0(x)=anf1(x)a^{f_0}_{n}(x)=a^{f_1}_{n}(x) for all nn, yet dimFSf0(x)=0\dim^{f_0}_{\mathrm{FS}}(x)=0 while dimFSf1(x)=1\dim^{f_1}_{\mathrm{FS}}(x)=1. Consequently, no criterion depending only on the sequence (Σnanf(x))n=0\left(|\Sigma|^{n} a^{f}_{n}(x)\right)_{n=0}^{\infty} - in particular, no equidistribution property of this sequence - can characterize ff-normality uniformly over all separator enumerators. On the other hand, for a natural finite-state coherent class of separator enumerators we recover a complete equidistribution characterization of ff-normality. We also show that beyond finite-state coherence, this characterization can fail even for a separator enumerator computable in nearly linear time.

Cite

@article{arxiv.2602.01199,
  title  = {On Normality and Equidistribution for Separator Enumerators},
  author = {Subin Pulari},
  journal= {arXiv preprint arXiv:2602.01199},
  year   = {2026}
}
R2 v1 2026-07-01T09:30:10.245Z