DocumentCode
1436202
Title
Markovian diffusive representation of 1/fα noises and application to fractional stochastic differential models
Author
Levernhe, Francis ; Montseny, Gerard ; Audounet, Jacques
Author_Institution
Ecole Nat. Superieure de l´´Aeronautique et de l´´Espace, Toulouse, France
Volume
49
Issue
2
fYear
2001
fDate
2/1/2001 12:00:00 AM
Firstpage
414
Lastpage
423
Abstract
This paper is devoted to linear stochastic differential systems with fractional noise (or fractional Brownian motion) input. On the basis of a convenient Markovian description of such noises, elaborated from a diffusive representation of fractional integrators previously introduced in a deterministic context, the fractional differential system is equivalently transformed into a standard (but infinite-dimensional) one, with white-noise input. Finite dimensional approximations may easily be obtained from classical discretization schemes. With this equivalent representation, the correlation function of processes described by linear fractional stochastic differential systems may be expressed from the solution of standard differential systems, which generalizes, in some way, the well-known differential Lyapunov equation, which appears when computing the covariance matrix associated with standard linear stochastic systems
Keywords
1/f noise; Brownian motion; Lyapunov matrix equations; Markov processes; covariance matrices; signal representation; stochastic processes; 1/fα noises; Markovian diffusive representation; classical discretization schemes; correlation function; covariance matrix; differential Lyapunov equation; equivalent representation; fractional Brownian motion; fractional integrators; fractional noise; fractional stochastic differential models; linear fractional stochastic differential systems; linear stochastic differential systems; white-noise; 1f noise; Brownian motion; Covariance matrix; Differential equations; Frequency domain analysis; Mathematical model; Numerical simulation; Stochastic processes; Stochastic resonance; Stochastic systems;
fLanguage
English
Journal_Title
Signal Processing, IEEE Transactions on
Publisher
ieee
ISSN
1053-587X
Type
jour
DOI
10.1109/78.902124
Filename
902124
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