Your search keyword '"Sheng You Wen"' showing total 3 results

1. Gauges for the cookie-cutter sets.

Author

Yu Xia Dai and Sheng You Wen

Subjects

*HAUSDORFF measures, *MATHEMATICAL functions, *EQUATIONS, *NUMERICAL analysis, *MATHEMATICAL analysis

Abstract

Let E be a cookie-cutter set with dim H E = s. It is known that the Hausdorff s-measure and the packing s-measure of the set E are positive and finite. In this paper, we prove that for a gauge function g the set E has positive and finite Hausdorff g-measure if and only if 0 < lim inf t→0 $$ \tfrac{{g(t)}} {{t^s }} $$ < ∞. Also, we prove that for a doubling gauge function g the set E has positive and finite packing g-measure if and only if 0 < lim sup t→0 $$ \tfrac{{g(t)}} {{t^s }} $$ < ∞. [ABSTRACT FROM AUTHOR]

Published

2009

2. A Certain Regular Property of the Method I Construction and Packing Measure.

Author

Sheng You Wen

Subjects

*SET theory, *METRIC spaces, *INTEGRAL theorems, *PACKING (Mechanical engineering), *MEASURE theory, *MATHEMATICS

Abstract

Let τ be a premeasure on a complete separable metric space and let τ* be the Method I measure constructed from τ. We give conditions on τ such that τ* has a regularity as follows: Every τ*-measurable set has measure equivalent to the supremum of premeasures of its compact subsets. Then we prove that the packing measure has this regularity if and only if the corresponding packing premeasure is locally finite. [ABSTRACT FROM AUTHOR]

Published

2007

3. Egoroff’s theorem and maximal run length.

Author

Ji-Hua Ma, Sheng-You Wen, and Zhi-Ying Wen

Abstract

Abstract.  We construct a sequence of measurable functions converging at each point of the unit interval, but the set of points with any given rate of convergence has Hausdorff dimension one. This is used to show that a version of Egoroff’s theorem due to Taylor is best possible. The construction relies on an analysis of the maximal run length of ones in the dyadic expansion of real numbers. It is also proved that the exceptional set for a limit theorem of Renyi has Hausdorff dimension one. [ABSTRACT FROM AUTHOR]

Published

2007