Beresnevich, Victor, Dickinson, Detta and Velani, Sanju (2001) Sets of exact ‘logarithmic’ order in the theory of Diophantine approximation. Mathematische Annalen, 321 (2). pp. 253-273. ISSN 0025-5831
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Abstract
For each real number α, let E(α) denote the set of real numbers with exact order α. A theorem of Güting states that for α≥2 the Hausdorff dimension of E(α) is equal to 2/α. In this note we introduce the notion of exact t–logarithmic order which refines the usual definition of exact order. Our main result for the associated refined sets generalizes Güting's result to linear forms and moreover determines the Hausdorff measure at the critical exponent. In fact, the sets are shown to satisfy delicate zero-infinity laws with respect to Lebesgue and Hausdorff measures. These laws are reminiscent of those satisfied by the classical set of well approximable real numbers, for example as demonstrated by Khintchine's theorem.
Item Type: | Article |
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Additional Information: | Cite as: Beresnevich, V., Dickinson, D. & Velani, S. Math Ann (2001) 321: 253. https://doi.org/10.1007/s002080100225 |
Keywords: | Real Number; Linear Form; Critical Exponent; Hausdorff Dimension Hausdorff Measure; |
Academic Unit: | Faculty of Science and Engineering > Mathematics and Statistics |
Item ID: | 10117 |
Identification Number: | 10.1007/s002080100225 |
Depositing User: | Dr. Detta Dickinson |
Date Deposited: | 18 Oct 2018 14:08 |
Journal or Publication Title: | Mathematische Annalen |
Publisher: | Springer Verlag |
Refereed: | Yes |
Related URLs: | |
URI: | https://mu.eprints-hosting.org/id/eprint/10117 |
Use Licence: | This item is available under a Creative Commons Attribution Non Commercial Share Alike Licence (CC BY-NC-SA). Details of this licence are available here |
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