Abstract
Baek in [2] and [3] defines the covering measures $h^s$ and $Q^s$ for a perturbed Cantor set $F$. He shows that when $s$ is the dimension of the covering measures $h^{s\text{ }}$and $Q^s$ on $F$, then $s$ is the Hausdorff dimension and the packing measure dimension on $F$. In this paper, it is shown that for the perturbed Cantor set $F$, the Hausdorff measure is equal to the covering measure $h^s$ on $F$. Under more restrictions on the set $F$, the packing measure is equal to $2\cdot Q^s.$ Similar results are shown for the weakly convergent deranged Cantor set.
Citation
Sandra Meinershagen. "The Hausdorff Measure and the Packing Measure on a Perturbed Cantor Set." Real Anal. Exchange 27 (1) 177 - 190, 2001/2002.
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