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Points of middle density in the real line

Csörnyei, Marianna; Grahl, Jack and O'Neil, Toby C. (2012). Points of middle density in the real line. Real Analysis Exchange, 37(2) pp. 243–248.

DOI: https://doi.org/10.14321/realanalexch.37.2.0243

Abstract

A Lebesgue measurable set in the real line has Lebesgue density 0 or 1 at almost every point. Kolyada showed that there is a positive constant $\delta$ such that for non-trivial measurable sets there is at least one point with upper and lower densities lying in the interval $(\delta, 1-\delta)$ . Both Kolyada and later Szenes gave bounds for the largest possible value of this $\delta$ . In this note we reduce the best known upper bound, disproving a conjecture of Szenes.

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About

Item ORO ID
31519
Item Type
Journal Item
ISSN
0147-1937
Keywords
Lebesgue upper density; Lebesgue lower density
Academic Unit or School
Faculty of Science, Technology, Engineering and Mathematics (STEM) > Mathematics and Statistics
Faculty of Science, Technology, Engineering and Mathematics (STEM)
Copyright Holders
© 2012 Michigan State University Press
Related URLs
- http://msupress.msu.edu/journals/raex/in...(Other)
Depositing User
Toby O'Neil

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