Representations of a number in an arbitrary base with unbounded digits

Pub Date : 2024-01-01 DOI:10.1515/gmj-2023-2118

ArtÅ«ras Dubickas

{"title":"Representations of a number in an arbitrary base with unbounded digits","authors":"ArtÅ«ras Dubickas","doi":"10.1515/gmj-2023-2118","DOIUrl":null,"url":null,"abstract":"In this paper, we prove that, for <m:math xmlns:m=\"http://www.w3.org/1998/Math/MathML\"> <m:mrow> <m:mi>β</m:mi> <m:mo>∈</m:mo> <m:mi>ℂ</m:mi> </m:mrow> </m:math> {\\beta\\in{\\mathbb{C}}} , every <m:math xmlns:m=\"http://www.w3.org/1998/Math/MathML\"> <m:mrow> <m:mi>α</m:mi> <m:mo>∈</m:mo> <m:mi>ℂ</m:mi> </m:mrow> </m:math> {\\alpha\\in{\\mathbb{C}}} has at most finitely many (possibly none at all) representations of the form <m:math xmlns:m=\"http://www.w3.org/1998/Math/MathML\"> <m:mrow> <m:mi>α</m:mi> <m:mo>=</m:mo> <m:mrow> <m:mrow> <m:msub> <m:mi>d</m:mi> <m:mi>n</m:mi> </m:msub> <m:mo>⁢</m:mo> <m:msup> <m:mi>β</m:mi> <m:mi>n</m:mi> </m:msup> </m:mrow> <m:mo>+</m:mo> <m:mrow> <m:msub> <m:mi>d</m:mi> <m:mrow> <m:mi>n</m:mi> <m:mo>-</m:mo> <m:mn>1</m:mn> </m:mrow> </m:msub> <m:mo>⁢</m:mo> <m:msup> <m:mi>β</m:mi> <m:mrow> <m:mi>n</m:mi> <m:mo>-</m:mo> <m:mn>1</m:mn> </m:mrow> </m:msup> </m:mrow> <m:mo>+</m:mo> <m:mi mathvariant=\"normal\">…</m:mi> <m:mo>+</m:mo> <m:msub> <m:mi>d</m:mi> <m:mn>0</m:mn> </m:msub> </m:mrow> </m:mrow> </m:math> {\\alpha=d_{n}\\beta^{n}+d_{n-1}\\beta^{n-1}+\\dots+d_{0}} with nonnegative integers <m:math xmlns:m=\"http://www.w3.org/1998/Math/MathML\"> <m:mrow> <m:mi>n</m:mi> <m:mo>,</m:mo> <m:msub> <m:mi>d</m:mi> <m:mi>n</m:mi> </m:msub> <m:mo>,</m:mo> <m:msub> <m:mi>d</m:mi> <m:mrow> <m:mi>n</m:mi> <m:mo>-</m:mo> <m:mn>1</m:mn> </m:mrow> </m:msub> <m:mo>,</m:mo> <m:mi mathvariant=\"normal\">…</m:mi> <m:mo>,</m:mo> <m:msub> <m:mi>d</m:mi> <m:mn>0</m:mn> </m:msub> </m:mrow> </m:math> {n,d_{n},d_{n-1},\\dots,d_{0}} if and only if β is a transcendental number or an algebraic number which has a conjugate over <m:math xmlns:m=\"http://www.w3.org/1998/Math/MathML\"> <m:mi>ℚ</m:mi> </m:math> {{\\mathbb{Q}}} (possibly β itself) in the real interval <m:math xmlns:m=\"http://www.w3.org/1998/Math/MathML\"> <m:mrow> <m:mo stretchy=\"false\">(</m:mo> <m:mn>1</m:mn> <m:mo>,</m:mo> <m:mi mathvariant=\"normal\">∞</m:mi> <m:mo stretchy=\"false\">)</m:mo> </m:mrow> </m:math> {(1,\\infty)} . The nontrivial part here is to show that for every algebraic number β lying with its all conjugates in <m:math xmlns:m=\"http://www.w3.org/1998/Math/MathML\"> <m:mrow> <m:mi>ℂ</m:mi> <m:mo>∖</m:mo> <m:mrow> <m:mo stretchy=\"false\">(</m:mo> <m:mn>1</m:mn> <m:mo>,</m:mo> <m:mi mathvariant=\"normal\">∞</m:mi> <m:mo stretchy=\"false\">)</m:mo> </m:mrow> </m:mrow> </m:math> {{\\mathbb{C}}\\setminus(1,\\infty)} , there is <m:math xmlns:m=\"http://www.w3.org/1998/Math/MathML\"> <m:mrow> <m:mi>α</m:mi> <m:mo>∈</m:mo> <m:mrow> <m:mi>ℚ</m:mi> <m:mo>⁢</m:mo> <m:mrow> <m:mo stretchy=\"false\">(</m:mo> <m:mi>β</m:mi> <m:mo stretchy=\"false\">)</m:mo> </m:mrow> </m:mrow> </m:mrow> </m:math> {\\alpha\\in{\\mathbb{Q}}(\\beta)} with infinitely many such representations. In a particular case, when β is a quadratic algebraic number, this was recently established by Kala and Zindulka.","PeriodicalId":0,"journal":{"name":"","volume":null,"pages":null},"PeriodicalIF":0.0,"publicationDate":"2024-01-01","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.1515/gmj-2023-2118","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}

引用次数: 0

Abstract

In this paper, we prove that, for β ∈ ℂ

{\beta\in{\mathbb{C}}}

, every α ∈ ℂ

{\alpha\in{\mathbb{C}}}

has at most finitely many (possibly none at all) representations of the form α = d n ⁢ β n + d n - 1 ⁢ β n - 1 + … + d 0

{\alpha=d_{n}\beta^{n}+d_{n-1}\beta^{n-1}+\dots+d_{0}}

with nonnegative integers n , d n , d n - 1 , … , d 0

{n,d_{n},d_{n-1},\dots,d_{0}}

if and only if β is a transcendental number or an algebraic number which has a conjugate over ℚ

{{\mathbb{Q}}}

(possibly β itself) in the real interval ( 1 , ∞ )

{(1,\infty)}

. The nontrivial part here is to show that for every algebraic number β lying with its all conjugates in ℂ ∖ ( 1 , ∞ )

{{\mathbb{C}}\setminus(1,\infty)}

, there is α ∈ ℚ ⁢ ( β )

{\alpha\in{\mathbb{Q}}(\beta)}

with infinitely many such representations. In a particular case, when β is a quadratic algebraic number, this was recently established by Kala and Zindulka.

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以任意基数表示数位无限制的数

在本文中，我们证明了对于 β∈ ℂ {\beta\in\{mathbb{C}}} ，每个 α∈ ℂ {\alpha\in\{mathbb{C}} 都有最有限多个（可能没有一个）"α"。每个 α∈ ℂ {\alpha\in\{mathbb{C}}} 最多有有限多个（可能根本没有）形式为 α = d n β n + d n - 1 β n - 1 + ... 的表示。+ d 0 {\alpha=d_{n}\beta^{n}+d_{n-1}\beta^{n-1}+\dots+d_{0}} 为非负整数 n , d n , d n - 1 , ..., d 0 {n,d_{n},d_{n-1},（dots,d_{0}}当且仅当β 是一个超越数或代数数，它在ℚ {{mathbb{Q}}}（可能是 β 本身）的实区间 ( 1 , ∞ ) {(1,\infty)} 上有一个共轭。这里非难的部分是要证明，对于每个代数数 β 和它在 ℂ ∖ ( 1 , ∞ ) {{mathbb{C}}\setminus(1,\infty)} 中的所有共轭数，都有α∈ ℚ ( β ) {\alpha\in{mathbb{Q}}(\beta)} 无穷多个这样的表示。在一种特殊情况下，当 β 是二次代数数时，卡拉和津杜尔卡最近证明了这一点。

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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