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KAKEYA SETS OVER NON-ARCHIMEDEAN LOCAL RINGS

Published online by Cambridge University Press:  28 March 2013

Evan P. Dummit
Affiliation:
UW-Madison, Department of Mathematics, 480 Lincoln Dr., Madison, WI 53706-1388,U.S.A. email [email protected]
Márton Hablicsek
Affiliation:
UW-Madison, Department of Mathematics, 480 Lincoln Dr., Madison, WI 53706-1388,U.S.A. email [email protected]
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Abstract

In a recent paper of Ellenberg, Oberlin, and Tao [The Kakeya set and maximal conjectures for algebraic varieties over finite fields. Mathematika 56 (2010), 1–25], the authors asked whether there are Besicovitch phenomena in ${ \mathbb{F} }_{q} \mathop{[[t] ] }\nolimits ^{n} $. In this paper, we answer their question in the affirmative by explicitly constructing a Kakeya set of measure zero in ${ \mathbb{F} }_{q} \mathop{[[t] ] }\nolimits ^{n} $. Furthermore, we prove that any Kakeya set in ${ \mathbb{F} }_{q} \mathop{[[t] ] }\nolimits ^{2} $ or ${ \mathbb{Z} }_{p}^{2} $ is of Minkowski dimension 2.

Type
Research Article
Copyright
Copyright © University College London 2013 

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References

Besicovitch, A., Sur deux questions d’intégrabilité des fonctions. J. Soc. Phys. Math. 2 (1919), 105123.Google Scholar
Davies, R. O., Some remarks on the Kakeya problem. Proc. Cambridge Phil. Soc. 69 (1971), 417421.CrossRefGoogle Scholar
Dvir, Z., On the size of Kakeya sets in finite fields. J. Amer. Math. Soc. 22 (2009), 10931097.CrossRefGoogle Scholar
Ellenberg, J.  S., Oberlin, R. and Tao, T., The Kakeya set and maximal conjectures for algebraic varieties over finite fields. Mathematika 56 (2010), 125.CrossRefGoogle Scholar
Wolff, T., An improved bound for Kakeya type maximal functions. Rev. Mat. Iberoam. 11 (1999), 651674.Google Scholar