On Fractional Brownian Motion and Wavelets |
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| Authors: | S. Albeverio P. E. T. Jorgensen A. M. Paolucci |
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| Affiliation: | (1) Department of Power Engineering, School of Nuclear Studies and Applications, Jadavpur University, Salt Lake Campus, LB-8, Sector 3, Kolkata, West Bengal, 700098, India;(2) Department of Power Engineering, Jadavpur University, Salt Lake Campus, LB-8, Sector 3, Kolkata, West Bengal, 700098, India |
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| Abstract: | Given a fractional Brownian motion (fBm) with Hurst index H ? (0,1){Hin(0,1)} , we associate with this a special family of representations of Cuntz algebras related to frequency domains and wavelets. Vice versa, we consider a pair of Haar wavelets satisfying some compatibility conditions, and we construct the covariance functions of fBm with a fixed Hurst index. The Cuntz algebra representations enter the picture as filters of the associated wavelets. Extensions to q-dependent covariance functions leading to a corresponding fBm process will also be discussed. |
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