论文信息 - Multifractal analysis and /spl alpha/-stable processes: a methodological contribution

Multifractal analysis and /spl alpha/-stable processes: a methodological contribution

This work is a contribution to the analysis of the procedure, based on wavelet coefficient partition functions, commonly used to estimate the Legendre multifractal spectrum. The procedure is applied to two examples, a fractional Brownian motion in multifractal time and a self-similar /spl alpha/-stable process, whose sample paths exhibit irregularities that by eye appear very close. We observe that, for the second example, this analysis results in a qualitatively inaccurate estimation of its multifractal spectrum, and a related masking of the /spl alpha/-stable nature of the process. We explain the origin of this error through a detailed analysis of the partition functions of the self-similar /spl alpha/-stable process. Such a study is made possible by the specific properties of the wavelet coefficients of such processes. We indicate how the estimation procedure might be modified to avoid such errors.

[1] E. Bacry,et al. Singularity spectrum of fractal signals from wavelet analysis: Exact results , 1993 .

[2] Ingrid Daubechies,et al. Ten Lectures on Wavelets , 1992 .

[3] Patrice Abry,et al. Wavelets for the Analysis, Estimation, and Synthesis of Scaling Data , 2002 .

[4] E. Bacry,et al. The Multifractal Formalism Revisited with Wavelets , 1994 .

[5] Stéphane Jaffard,et al. Multifractal formalism for functions part I: results valid for all functions , 1997 .

[6] Patrice Abry,et al. Stochastic integral representation and properties of the wavelet coefficients of linear fractional stable motion , 2000 .

[7] B. Gnedenko,et al. Limit Distributions for Sums of Independent Random Variables , 1955 .

[8] W. Linde. STABLE NON‐GAUSSIAN RANDOM PROCESSES: STOCHASTIC MODELS WITH INFINITE VARIANCE , 1996 .

[9] M. Taqqu,et al. Stable Non-Gaussian Random Processes : Stochastic Models with Infinite Variance , 1995 .

[10] Béatrice Pesquet-Popescu,et al. Statistical properties of the wavelet decomposition of certain non-Gaussian self-similar processes , 1999, Signal Process..

[11] Patrice Abry,et al. Wavelet based estimator for the self-similarity parameter of α-stable processes. , 1999 .

[12] Rudolf H. Riedi,et al. Wavelet analysis of fractional Brownian motion in multifractal time , 1999 .

[13] B. Mandelbrot. A Multifractal Walk down Wall Street , 1999 .