论文信息 - Some Distributional Properties of the Continuous Wavelet Transform of Random Processes

Some Distributional Properties of the Continuous Wavelet Transform of Random Processes

Without finite moment conditions, some properties of random processes, such as stationarity and self-similarity, are characterized via corresponding properties of their wavelet transform. Anyone of these distributional properties of the wavelet transform characterizes the corresponding property of the increments of the random process, of order equal to the order of regularity of the analyzing wavelet. Extensions of these results to random fields are then indicated.

Christian Houdré | Roland Averkamp

[1] Marc Yor. Remarques sur certaines constructions des mouvements browniens fractionnaires , 1988 .

[2] Elias Masry,et al. The wavelet transform of stochastic processes with stationary increments and its application to fractional Brownian motion , 1993, IEEE Trans. Inf. Theory.

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

[4] Gregory W. Wornell,et al. A Karhunen-Loève-like expansion for 1/f processes via wavelets , 1990, IEEE Trans. Inf. Theory.

[5] Patrick Flandrin,et al. On the spectrum of fractional Brownian motions , 1989, IEEE Trans. Inf. Theory.

[6] Ofer Zeitouni,et al. On the wavelet transform of fractional Brownian motion , 1991, IEEE Trans. Inf. Theory.

[7] Stamatis Cambanis,et al. On the continuous wavelet transform of second-order random processes , 1995, IEEE Trans. Inf. Theory.

[8] A. Yaglom. Correlation Theory of Stationary and Related Random Functions I: Basic Results , 1987 .

[9] Jean-Christophe Pesquet,et al. Multiresolution analysis of a class of nonstationary processes , 1995, IEEE Trans. Inf. Theory.

[10] H. Wold,et al. Some Theorems on Distribution Functions , 1936 .

[11] D. Applebaum. Stable non-Gaussian random processes , 1995, The Mathematical Gazette.