From Randomness in Two Symbols to Randomness in Three Symbols

Uniform distribution theory Pub Date : 2017-11-11 DOI:10.2478/udt-2021-0010

Ariel Zylber

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引用次数: 2

Abstract

Abstract In 1909 Borel defined normality as a notion of randomness of the digits of the representation of a real number over certain base (fractional expansion). If we think of the representation of a number over a base as an infinite sequence of symbols from a finite alphabet A, we can define normality directly for words of symbols of A: A word x is normal to the alphabet A if every finite block of symbols from A appears with the same asymptotic frequency in x as every other block of the same length. Many examples of normal words have been found since its definition, being Champernowne in 1933 the first to show an explicit and simple instance. Moreover, it has been characterized how we can select subsequences of a normal word x preserving its normality, always leaving the alphabet A fixed. In this work we consider the dual problem which consists of inserting symbols in infinitely many positions of a given word, in such a way that normality is preserved. Specifically, given a symbol b that is not present in the original alphabet A and given a word x that is normal to the alphabet A we solve how to insert the symbol b in infinitely many positions of the word x such that the resulting word is normal to the expanded alphabet A ∪{b}.

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从两个符号的随机性到三个符号的随机性

1909年，Borel将正态性定义为实数在一定基数(分数展开)上表示的数字的随机性概念。如果我们把基数上一个数的表示看作是有限字母a的符号的无限序列，我们可以直接定义a的符号的词的正态性:如果来自a的符号的每一个有限块在x中以相同的渐近频率出现，那么单词x就是字母a的正态性。自其定义以来，已经发现了许多正常词汇的例子，1933年的Champernowne是第一个给出明确而简单的例子。此外，它还描述了我们如何选择正常单词x的子序列，保持其正态性，始终保持字母a固定。在本工作中，我们考虑了一个对偶问题，该问题包括在给定单词的无限多个位置插入符号，以这种方式保持正态性。具体来说，给定一个不存在于原始字母表a中的符号b和一个垂直于字母表a的单词x，我们解决如何将符号b插入到单词x的无穷多个位置，从而使结果单词垂直于扩展后的字母表a∪{b}。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Uniform distribution theory

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