Modeling of chaotic time series for prediction, interpolation, and smoothing

Author

Sidorowich, John J.

Author_Institution

Inst. for Nonlinear Sci., California Univ., La Jolla, CA, USA

Volume

4

fYear

1992

fDate

23-26 Mar 1992

Firstpage

121

Abstract

Chaos poses a significant challenge for the time series analyst, since structure in strange attractors tends to be very intricate and nonuniform. Although frequently referred to as unpredictable deterministic behavior, chaotic systems can in fact be forecast over limited time scales. Techniques for constructing predictive models for chaotic dynamics are discussed, including a variety of functional interpolation schemes and several examples of connectionist approaches to the problem. Error estimates based on polynomial interpolation are provided. The underlying deterministic nature of chaotic signals motivates a nonlinear smoothing procedure for the reduction of noise

Keywords

chaos; interpolation; polynomials; signal processing; time series; chaotic dynamics; chaotic signals; chaotic systems; chaotic time series; connectionist modelling; error estimates; functional interpolation; noise reduction; nonlinear smoothing; polynomial interpolation; predictive models; strange attractors; Chaos; Interpolation; Least squares approximation; Noise reduction; Polynomials; Predictive models; Smoothing methods; Stability; State-space methods; Vectors;

fLanguage

English

Publisher

ieee

Conference_Titel

Acoustics, Speech, and Signal Processing, 1992. ICASSP-92., 1992 IEEE International Conference on

Conference_Location

San Francisco, CA

ISSN

1520-6149

Print_ISBN

0-7803-0532-9

Type

conf

DOI

10.1109/ICASSP.1992.226471

Filename

226471