Csörnyei, Marianna; Grahl, Jack and O'Neil, Toby C.
(2012).
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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 such that for non-trivial measurable sets there is at least one point with upper and lower densities lying in the interval
. Both Kolyada and later Szenes gave bounds for the largest possible value of this
. In this note we reduce the best known upper bound, disproving a conjecture of Szenes.
| Item Type: | Journal Article |
|---|---|
| Copyright Holders: | 2012 Michigan State University Press |
| ISSN: | 0147-1937 |
| Keywords: | Lebesgue upper density; Lebesgue lower density |
| Academic Unit/Department: | Faculty of Science, Technology, Engineering and Mathematics (STEM) > Mathematics and Statistics Faculty of Science, Technology, Engineering and Mathematics (STEM) |
| Related URLs: | |
| Item ID: | 31519 |
| Depositing User: | Toby O'Neil |
| Date Deposited: | 29 Nov 2012 10:13 |
| Last Modified: | 04 Aug 2016 15:21 |
| URI: | http://oro.open.ac.uk/id/eprint/31519 |
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