No CrossRef data available.
Article contents
On expressible sets and p-adic numbers
Published online by Cambridge University Press: 25 February 2011
Abstract
Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.
Continuing earlier studies over the real numbers, we study the expressible set of a sequence A = (an)n≥1 of p-adic numbers, which we define to be the set EpA = {∑n≥1ancn: cn ∈ ℕ}. We show that in certain circumstances we can calculate the Haar measure of EpA exactly. It turns out that our results extend to sequences of matrices with p-adic entries, so this is the setting in which we work.
MSC classification
- Type
- Research Article
- Information
- Copyright
- Copyright © Edinburgh Mathematical Society 2011
References
2.Asmar, N. H. and Nair, R., Certain averages on the a-adic numbers, Proc. Am. Math. Soc. 114(1) (1992), 21–28.Google Scholar
3.Beresnevich, V., Dickinson, H. and Velani, S., Measure theoretic laws for lim sup sets, Memoirs of the American Mathematical Society, Volume 179 (American Mathematical Society, Providence, RI, 2006).Google Scholar
4.Bernik, V. I. and Dodson, M. M., Metric Diophantine approximation on manifolds, Cambridge Tracts in Mathematics, Volume 137 (Cambridge University Press, 1999).Google Scholar
5.Bodiagin, D., Hančl, J., Nair, R. and Rucki, P., On summing to arbitrary real numbers, Elem. Math. 63(1) (2008), 30–34.Google Scholar
6.Cassels, J. W. S., Local fields, London Mathematical Society Student Texts, Volume 3 (Cambridge University Press, 1986).Google Scholar
7.Erdős, P., Some problems and results on the irrationality of the sum of infinite series, J. Math. Sci. 10 (1975), 1–7.Google Scholar
8.Hančl, J., Expression of real numbers with the help of infinite series, Acta Arith. 59 (1991), 97–104.CrossRefGoogle Scholar
9.Hančl, J., Two criteria for transcendental sequences, Matematiche (Catania) 56(1) (2001), 149–160.Google Scholar
11.Hančl, J. and Filip, F., Irrationality measure of sequences, Hiroshima Math. J. 35(2) (2005), 183–195.CrossRefGoogle Scholar
12.Hančl, J., Nair, R. and Šustek, J., On the Lebesgue measure of the expressible set of certain sequences, Indagationes Math. 17(4) (2006), 567–581.CrossRefGoogle Scholar
13.Hančl, J. and Šustek, J., Expressible sets of certain sequences with Hausdorff dimension zero, Monatsh. Math. 152(4) (2007), 315–319.CrossRefGoogle Scholar
14.Lutz, É., Sur les approximations diophantiennes linéaires P-adiques, Actualités Scientifiques Et Industrielles, Volume 1224 (Hermann, Paris, 1955).Google Scholar
You have
Access