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1998/1999 A 1-Dimensional Subset of the Reals that Intersects Each of its Translates in at Most a Single Point
Tamás Keleti
Real Anal. Exchange 24(2): 843-845 (1998/1999).

Abstract

We construct a compact subset of $\R$ with Hausdorff dimension 1 that intersects each of its non-identical translates in at most one point. Moreover, one can make the set to be linearly independent over the rationals.

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Tamás Keleti. "A 1-Dimensional Subset of the Reals that Intersects Each of its Translates in at Most a Single Point." Real Anal. Exchange 24 (2) 843 - 845, 1998/1999.

Information

Published: 1998/1999
First available in Project Euclid: 28 September 2010

zbMATH: 0971.28001
MathSciNet: MR1704757

Subjects:
Primary: 28A78

Keywords: Hausdorff dimension , intersection , linearly independent , translation

Rights: Copyright © 1999 Michigan State University Press

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Vol.24 • No. 2 • 1998/1999
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