Discriminant procedure for dynamical equation reconstruction from noisy experimental data and for revealing nonstationarity in chaotic systems

Discriminant procedure for dynamical equation reconstruction from noisy experimental data and for revealing nonstationarity in chaotic systems

Discriminant procedure developed in 30-thies and dealing with two time-window statistical analysis of time series is generalized for studying nonstationary chaotic processes. For these purposes discriminant function is to be chosen in the form of model dynamical equation with indefinite coefficients...

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Bibliographic Details
Published in:2000 2nd International Conference. Control of Oscillations and Chaos. Proceedings (Cat. No.00TH8521) Vol. 2; pp. 390 - 393 vol.2
Main Authors: Butkovskii, O.Y., Kravtsov, Y.A., Kapranov, M.V., Morozov, A.G.
Format: Conference Proceeding
Language:English
Published: IEEE 2000
Subjects:
Chaotic communication
Heart
Minimax techniques
Nonlinear equations
Postal services
Power engineering
Power system modeling
Predictive models
Rhythm
Statistical analysis
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Summary:Discriminant procedure developed in 30-thies and dealing with two time-window statistical analysis of time series is generalized for studying nonstationary chaotic processes. For these purposes discriminant function is to be chosen in the form of model dynamical equation with indefinite coefficients, which are to be determined from Fisher's minimax criterion. Thereby the dynamical equation for a system under consideration can be recovered. The optimal length of a sample is shown to be comparable with the interval of predictability. It is shown also, that low dimensional dynamical models for the studied process are able to reveal nonstationarity even from chaotic time series of high dimension. The suggested method can be applied to analysis of hidden communication systems with chaotic carrier, heart rhythms nonstationarity and other physical and biophysical systems.
ISBN:0780364341
9780780364349
DOI:10.1109/COC.2000.873999