JOURNAL ARTICLE

Large Sets Avoiding Infinite Arithmetic / Geometric Progressions.

  • Published In: Real Analysis Exchange, 2023, v. 48, n. 2. P. 351 1 of 2

  • Database: Academic Search Ultimate 2 of 2

Abstract

We study some variants of the Erdös similarity problem. We pose the question if every measurable subset of the real line with positive measure contains a similar copy of an infinite geometric progression. We construct a compact subset $E$ of the real line such that $0$ is a Lebesgue density point of $E$, but $E$ does not contain any (non-constant) infinite geometric progression. We give a sufficient density type condition that guarantees that a set contains an infinite geometric progression. By slightly improving a recent result of Bradford, Kohut and Mooroo-gen we construct a closed set $F\subset[0,\infty)$ such that the measure of $F\cap[t,t+1]$ tends to $1$ at infinity but $F$ does not contain any infinite arithmetic progression. We also slightly improve a more general recent result by Kolountzakis and Papageorgiou for more general sequences. We give a sufficient condition that guarantees that a given Cantor type set contains at least one infinite geometric progression with any quotient between $0$ and $1$. This can be applied to most symmetric Cantor sets of positive measure. [ABSTRACT FROM AUTHOR]

Additional Information

  • Source:Real Analysis Exchange. 2023/07, Vol. 48, Issue 2, p351
  • Document Type:Article
  • Subject Area:Mathematics
  • Publication Date:2023
  • ISSN:0147-1937
  • DOI:10.14321/realanalexch.48.2.1668676378
  • Accession Number:174427447
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