Topological analysis of chaotic dynamical systems

Gilmore, Robert

doi:10.1103/revmodphys.70.1455

Cited by 250 publications

(264 citation statements)

References 133 publications

(119 reference statements)

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“…RP enables to investigate the structure of these high dimensional phase spaces through a two-dimensional representation of their recurrences. It is important to observe that the recurrence plot method is effective for even nonstationary and rather short time series (Gilmore, 1993;Gilmore, 1998).Generally recurrence plots are designed to locate hidden recurring patterns and structure in time series and are defined by the N × N symmetric matrix:…”

Section: Phase Space Structures As Image Of Dynamicsmentioning

confidence: 99%

Identification of Complex Processes Based on Analysis of Phase Space Structures

Matcharashvili

Chélidzé

Janiashvili³

Imaging for Detection and Identification

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Abstract. The problem of investigation of temporal and/or spatial behavior of highly nonlinear or complex natural systems has long been of fundamental scientific interest. At the same time it is presently well understood that identification of dynamics of processes in complex natural systems, through their qualitative description and quantitative evaluation, is far from a purely academic question and has an essential practical importance. This is quite understandable as systems with complex dynamics abound in nature and examples can be found in very different areas such as medicine and biology (rhythms, physiological cycles, epidemics), atmosphere (climate and weather change), geophysics (tides, earthquakes, volcanoes, magnetic field variations), economy (financial markets behavior, exchange rates), engineering (friction, fracturing), communication (electronic networks, internet packet dynamics) etc. The past two decades of research on qualitative and especially quantitative investigations of dynamics of real processes of different origin brought significant progress in the understanding of behavior of natural processes. At the same time serious drawbacks have also been revealed. This is why exhaustive investigation of dynamical properties of complex processes for scientific, engineering or practical purposes is now recognized as one of the main scientific challenges. Much attention is paid to elaboration of appropriate methods aiming to measuring the complexity of both global and local dynamical behaviors from the observed data sets -time series. This chapter presents a short overview of modern methods of qualitative and quantitative evaluation of dynamics of complex natural processes such as calculation of Lyapunov exponents and fractal dimensions, recurrence plots and recurrence quantification analysis. Other related methods are also described. The traditional approach to studying dynamical behavior of complex nonlinear systems is to reconstruct from observation scalar time series state or phase space plot. This graph indicates how the systems behavior changes over the time. We focus on the methods of identification and quantitative evaluation of complex dynamics that are based on the testing of evolutionary and geometric properties of phase space graphs as images of investigated complex dynamics. For practical examples of the application c 2006 Springer. Printed in the Netherlands.of nonlinear methods for identification of complex natural processes, our results on medical, geophysical, hydrological, and stick-slip time series analysis are presented.

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Section: Phase Space Structures As Image Of Dynamicsmentioning

confidence: 99%

Identification of Complex Processes Based on Analysis of Phase Space Structures

Matcharashvili

Chélidzé

Janiashvili³

Imaging for Detection and Identification

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“…Qualitative information is that which allows a qualitative description of the dynamics described by topological invariants, such as for instance, singularity of the field, closeness of an orbit, stability of a fixed point, etc. (Gilmore, 1998) Quantitative information can be of two different types: geometrical and dynamical. Geometrical properties (Grassberger, 1983) consist on fractal dimensions or scaling functions.…”

Section: Embedding Theorymentioning

confidence: 99%

Application of nonlinear time series analysis techniques to high-frequency currency exchange data

Strozzi

Zaldı́var

Zbilut

2002

Physica A: Statistical Mechanics and its Applications

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“…As an alternative to delay and derivative phase-space reconstructions, a mix of integrals and derivatives has been suggested [9,10]. The presence of an integral can introduce a drift in the reconstruction.…”

Section: Introductionmentioning

confidence: 99%

Fractional derivative reconstruction of forced oscillators

2008

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Fractional derivatives are applied in the reconstruction, from a single observable, of the dynamics of a Duffing oscillator and a two-well experiment. The fractional derivatives of time series data are obtained in the frequency domain. The derivative fraction is evaluated using the average mutual information between the observable and its fractional derivative. The ability of this reconstruction method to unfold the data is assessed by the method of global false nearest neighbors. The reconstructed data is used to compute recurrences and fractal dimensions. The reconstruction is compared to the true phase space and the delay reconstruction in order to assess the reconstruction parameters and the quality of results.

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Topological analysis of chaotic dynamical systems

Cited by 250 publications

References 133 publications

Identification of Complex Processes Based on Analysis of Phase Space Structures

Identification of Complex Processes Based on Analysis of Phase Space Structures

Application of nonlinear time series analysis techniques to high-frequency currency exchange data

Fractional derivative reconstruction of forced oscillators

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