Detecting Switch Dynamics in Chaotic Time-Waveform using a Parametrized Family of Nonlinear Predictors

Autor:	Ryuji Tokunaga, Takashi Matsumoto, Isao T. Tokuda
Jazyk:	angličtina
Rok vydání:	2000
Předmět:	Period-doubling bifurcation non-stationarity chaos switch dynamics Chaotic Statistical and Nonlinear Physics Lorenz system Condensed Matter Physics Dynamical system Nonlinear Sciences::Chaotic Dynamics Nonlinear system chaotic time-waveform Control theory parametrized family of nonlinear predictors bifurcation Applied mathematics Waveform Bifurcation Chaotic hysteresis Mathematics
Zdroj:	Physica D : Nonlinear Phenomena. 135(1-2):63-78
ISSN:	0167-2789
Popis:	An algorithm is presented for detecting switch dynamics in chaotic time-waveform. By the “switch dynamics,” we mean that the chaotic time-waveform is measured from a dynamical system whose bifurcation parameters are occasionally switched among a set of slightly different parameter values. First, the switched chaotic time-waveform is divided into windows of short-term time-waveforms. From the set of windowed time-waveforms, “qualitatively similar” parametrized family of nonlinear predictors is constructed. “Qualitatively similar” parametrized family means that the family of nonlinear predictors exhibits “qualitatively similar” bifurcation phenomena as the original. By characterizing the windows of short-term chaotic time-waveforms in terms of the “qualitative” parameters of nonlinear predictors, switch dynamics of their associated bifurcation parameters are detected. For the Lorenz equations, the Rossler equations, and the Mackey–Glass equations, efficiency of the algorithm is demonstrated. In the experiment, chaotic time-waveforms contaminated with observational noise is considered.
Databáze:	OpenAIRE
Externí odkaz:	https://explore.openaire.eu/search/publication?articleId=doi_dedup___::55892f3ec9c84156a5ceaed4614e5ce8 http://hdl.handle.net/10119/4898 Zobrazit plný text záznamu Full Text from ScienceDirect