Dependence of Hausdorff measure and dimension with the metric of the underlying space(Chinese)

Journal of East China Normal University(Natural Sc ›› 2008, Vol. 2008 ›› Issue (5): 78-83,1.

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Dependence of Hausdorff measure and dimension with the metric of the underlying space(Chinese)

CHEN Hai-long¹, GUI Yong-xin²

1. Department of Mathematics, East China Normal University, Shanghai 200062, China;2. Department of Mathematics, Xian Ning University, Xian Ning 437005, China

Received:2007-10-01 Revised:2008-01-10 Online:2008-09-25 Published:2008-09-25
Contact: CHEN Hai-long

Abstract

Abstract: This paper discussed the construction of metric space on the nested geometrical object. Given a nested geometrical object K in Rⁿ and a continuous gauge function h(t), a new metric p was constructed on K such that 0<H^h (K)<+∞ in the new metric space (K, p). Particularly, if the gauge function is h(t)=t^s, then for any positive finite number s, it's also possible to construct a new metric p on K such that ~$\mathscrH^h (K)=1 and
dim_PK=dim_BK=dim_HK=s.

Key words: Hausdorff measure, metric, nested geometrical object, Hausdorff measure, metric

CLC Number:

O174.5

CHEN Hai-long;GUI Yong-xin. Dependence of Hausdorff measure and dimension with the metric of the underlying space(Chinese)[J]. Journal of East China Normal University(Natural Sc, 2008, 2008(5): 78-83,1.

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Dependence of Hausdorff measure and dimension with the metric of the underlying space(Chinese)

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