Equidistribution Mod $1$ And Normal Numbers

N. A. Carella

arXiv:2109.00562·math.GM·January 26, 2023

Equidistribution Mod $1$ And Normal Numbers

N. A. Carella

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TL;DR

This paper discusses the concept of normal numbers in base $b$, presents a proof of the normality of $\

Contribution

It provides three different proofs, including two unconditional ones, demonstrating the normality of $\

Findings

01

Proof of normality of $\

02

Three different proofs including two unconditional methods

Abstract

Let $α = 0. a_{1} a_{2} a_{3} \dots$ be an irrational number in base $b > 1$ , where $0 \leq a_{i} < b$ . The number $α \in (0, 1)$ is a \textit{normal number} if every block $(a_{n + 1} a_{n + 2} \dots a_{n + k})$ of $k$ digits occurs with probability $1/ b^{k}$ . A proof of the normality of the real number $2$ in base $10$ is presented in this note. Three different proofs based on different methods are given: a conditional proof, and two unconditional proofs.

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Taxonomy

TopicsAnalytic Number Theory Research · Mathematics and Applications · Computability, Logic, AI Algorithms