Hausdorff measure of p-Cantor sets

CABRELLI, CARLOS A.; MOLTER, URSULA M.; PAULAUSKAS, VYGANTAS; SHONKWILER, RONALD

REAL ANALYSIS EXCHANGE

Michigan Sate University Press

Lugar: East Lansing, MI; Año: 2005 vol. 30 p. 413 - 433

0147-1937

In this paper we analyze Cantor type sets constructed by the re- moval of open intervals whose lengths are the terms of the p-sequence, {k^{-p} }∞k=1 . We prove that these Cantor sets are s-sets, by providing sharp estimates of their Hausdorff measure and dimension. Sets of similar structure arise when studying the set of extremal points of the boundaries of the so-called random stable zonotopes.