MULTIFRACTAL STRUCTURE AND PRODUCT OF MATRICES

MULTIFRACTAL STRUCTURE AND PRODUCT OF MATRICES

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摘要 There is a well established multifractal theory for self-similar measures generated by non-overlapping contractive similutudes. Our report here concerns those with overlaps. In particular we restrict our attention to the important classes of self-similar measures that have matrix representations. The dimension spectra and the L q -spectra are analyzed through the product of matrices. There are abnormal behaviors on the multifractal structure and they will be discussed in detail. There is a well established multifractal theory for self-similar measures generated by non-overlapping contractive similutudes. Our report here concerns those with overlaps. In particular we restrict our attention to the important classes of self-similar measures that have matrix representations. The dimension spectra and the L q -spectra are analyzed through the product of matrices. There are abnormal behaviors on the multifractal structure and they will be discussed in detail.

作者 Lau Ka-sing

机构地区 Department of Mathematics Chinese University of Hong Kong

出处《Analysis in Theory and Applications》 2003年第4期289-311,共23页 分析理论与应用（英文刊）

基金 TheresearchissupportedinpartbytheHKRGCGrant

关键词 MULTIFRACTAL self-similar measure iterated function system dimension spectra multifractal,self-similar measure,iterated function system,dimension spectra

分类号 O29 [理学—应用数学]

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MULTIFRACTAL STRUCTURE AND PRODUCT OF MATRICES

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