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Mařík, Jan
The Hausdorff dimension of some special plane sets. (English). Mathematica Bohemica, vol. 119 (1994), issue 4, pp. 359-366
MSC: 28A05, 28A78 | MR 1316587 | Zbl 0813.28001 | DOI: 10.21136/MB.1994.126119
Keywords:
Hausdorff dimension; compact plane set; Hausdorff measure
Summary:
A compact set $T\subset \bold R^2$ is constructed such that each horizontal or vertical line intersects $T$ in at most one point while the $\alpha$-dimensional measure of $T$ is infinite for every $\alpha \in (0,2)$.
References:
[1] S. Saks: Theory of the integral. Dover Publications, 1964. MR 0167578
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