Fifty years of the Erdős similarity conjecture

被引：2

作者：

Jung, Yeonwook ^{[1
]}

Lai, Chun-Kit ^{[2
]}

Mooroogen, Yuveshen ^{[3
]}

机构：

[1] Univ Calif Irvine, Dept Math, Rowland Hall, Irvine, CA 92697 USA

[2] San Francisco State Univ, Dept Math, 1600 Holloway Ave, San Francisco, CA 94132 USA

[3] Univ British Columbia, 2329 West Mall, Vancouver, BC V6T 1Z4, Canada

来源：

RESEARCH IN THE MATHEMATICAL SCIENCES | 2025年 / 12卷 / 01期

关键词：

SZEMEREDI-TYPE THEOREM; POSITIVE UPPER DENSITY; SETS; SUBSETS; DISTANCE; CONSTRUCTION;

D O I：

10.1007/s40687-025-00495-w

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

The Erd & odblac;s similarity conjecture was proposed by P. Erd & odblac;s in 1974. The conjecture remains open for exponentially decaying sequences as well as Cantor sets that have both Newhouse thickness and Hausdorff dimension zero. In this article-written 50 years after the conjecture was first proposed-we review progress on some new variants of the original problem, namely the bi-Lipschitz variant, the topological variant, and a variant "in the large". These problems were recently studied by the authors and their collaborators. Each of them offers new perspectives on the original conjecture.

引用

页数：22

共 57 条

[51] Salem Sets with No Arithmetic Progressions [J].

Shmerkin, Pablo .

INTERNATIONAL MATHEMATICS RESEARCH NOTICES, 2017, 2017 (07) :1929-1941

[52]

Sierpiski W., 1928, Fundam. Math, V11, P302, DOI DOI 10.4064/FM-11-1-302-303

[53]

STEINHAUS H, 1920, FUND MATH, V1, P93

[54]

Svetic R. E., 2000, REAL ANAL EXCH, V26, P525, DOI DOI 10.2307/44154057

[55]

Szkely LA., 1983, Remarks on the chromatic number of geometric graphs, Teubner-Texte Math, V59

[56] EXPLORING THE TOOLKIT OF JEAN BOURGAIN [J].

Tao, Terence .

BULLETIN OF THE AMERICAN MATHEMATICAL SOCIETY, 2021, 58 (02) :155-171

[57] LARGE SETS AVOIDING LINEAR PATTERNS [J].

Yavicoli, Alexia .

PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY, 2021, 149 (10) :4057-4066

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