Identification of Partial Differential Equation Models for Continuous Spatio-Temporal Dynamical Systems

Author

Guo, Lingzhong ; Billings, Stephen A.

Author_Institution

Dept. of Autom. Control & Syst. Eng., Univ. of Sheffield

Volume

53

Issue

8

fYear

2006

Firstpage

657

Lastpage

661

Abstract

The identification of a class of continuous spatio-temporal dynamical systems from observations is presented in this paper. The proposed approach is a combination of implicit Adams integration and an orthogonal least-squares algorithm, in which the operators are expanded using polynomials as basis functions, and the spatial derivatives are estimated by finite difference methods. The resulting identified models of the spatio-temporal evolution form a system of partial differential equations. Examples are provided to demonstrate the efficiency of the proposed method

Keywords

identification; least mean squares methods; nonlinear dynamical systems; partial differential equations; Adams integration; continuous spatio-temporal dynamical systems; finite difference methods; implicit Adams-Moulton formula; orthogonal least-squares algorithm; partial differential equation model identification; spatio-temporal evolution; Control system analysis; Councils; Coupled mode analysis; Distributed parameter systems; Finite difference methods; Finite element methods; Helium; Lattices; Partial differential equations; Polynomials; Continuous spatio-temporal system; implicit Adams–Moulton formula; orthogonal least-squares algorithm; partial differential equation (PDE) identification;

fLanguage

English

Journal_Title

Circuits and Systems II: Express Briefs, IEEE Transactions on

Publisher

ieee

ISSN

1549-7747

Type

jour

DOI

10.1109/TCSII.2006.876464

Filename

1683975