Multifractal Formalism for Almost all Self-Affine Measures

被引:0
|
作者
Julien Barral
De-Jun Feng
机构
[1] Institut Galilée,LAGA (UMR 7539), Département de Mathématiques
[2] Université Paris 13,Department of Mathematics
[3] The Chinese University of Hong Kong,undefined
来源
Communications in Mathematical Physics | 2013年 / 318卷
关键词
Hausdorff Dimension; Gibbs Measure; Iterate Function System; Borel Probability Measure; Multifractal Analysis;
D O I
暂无
中图分类号
学科分类号
摘要
We conduct the multifractal analysis of self-affine measures for “almost all” family of affine maps. Besides partially extending Falconer’s formula of Lq-spectrum outside the range 1 < q ≤ 2, the multifractal formalism is also partially verified.
引用
收藏
页码:473 / 504
页数:31
相关论文
共 50 条
  • [1] Multifractal Formalism for Almost all Self-Affine Measures
    Barral, Julien
    Feng, De-Jun
    [J]. COMMUNICATIONS IN MATHEMATICAL PHYSICS, 2013, 318 (02) : 473 - 504
  • [2] Multifractal formalism for self-affine measures with overlaps
    Qi-Rong Deng
    Sze-Man Ngai
    [J]. Archiv der Mathematik, 2009, 92 : 614 - 625
  • [3] Multifractal formalism for self-affine measures with overlaps
    Deng, Qi-Rong
    Ngai, Sze-Man
    [J]. ARCHIV DER MATHEMATIK, 2009, 92 (06) : 614 - 625
  • [4] Generalized dimensions of measures on almost self-affine sets
    Falconer, Kenneth J.
    [J]. NONLINEARITY, 2010, 23 (05) : 1047 - 1069
  • [5] A class of self-affine sets and self-affine measures
    Feng, DJ
    Wang, Y
    [J]. JOURNAL OF FOURIER ANALYSIS AND APPLICATIONS, 2005, 11 (01) : 107 - 124
  • [6] A Class of Self-Affine Sets and Self-Affine Measures
    De-Jun Feng
    Yang Wang
    [J]. Journal of Fourier Analysis and Applications, 2005, 11 : 107 - 124
  • [7] Multifractal characterization for classification of self-affine signals
    Barry, RL
    Kinsner, W
    Pear, J
    Martin, T
    [J]. CCECE 2003: CANADIAN CONFERENCE ON ELECTRICAL AND COMPUTER ENGINEERING, VOLS 1-3, PROCEEDINGS: TOWARD A CARING AND HUMANE TECHNOLOGY, 2003, : 1869 - 1872
  • [8] Self-affine multifractal Sierpinski Sponges in Rd
    Olsen, L
    [J]. PACIFIC JOURNAL OF MATHEMATICS, 1998, 183 (01) : 143 - 199
  • [9] Multifractal Spectra of Random Self-Affine Multifractal Sierpinski Sponges in Rd
    Fraser, J. M.
    Olsen, L.
    [J]. INDIANA UNIVERSITY MATHEMATICS JOURNAL, 2011, 60 (03) : 937 - 983
  • [10] Uniformity of spectral self-affine measures
    Deng, Qi-Rong
    Chen, Jian-Bao
    [J]. ADVANCES IN MATHEMATICS, 2021, 380
12345