Parameter identification via shifted Legendre polynomials
- 1 October 1982
- journal article
- research article
- Published by Taylor & Francis in International Journal of Systems Science
- Vol. 13 (10) , 1125-1135
- https://doi.org/10.1080/00207728208926416
Abstract
An operational matrix for the integration of the shifted Legendre vector whose elements are the shifted Legendre polynomial functions is developed and applied to the parameter identification of time invariant linear systems. By employing operational matrix of shifted Legendre polynomials to approach identification problem, the algorithms for computation are effective and straightforward, and the computational results are accurate, compared to other numerical values in the literature.Keywords
This publication has 6 references indexed in Scilit:
- Laguerre series solution of a functional differential equationInternational Journal of Systems Science, 1982
- Parameter Estimation of Delay Systems Via Block Pulse FunctionsJournal of Dynamic Systems, Measurement, and Control, 1980
- Solving integral equations via Walsh functionsComputers and Electrical Engineering, 1979
- Analysis and optimal control of time-varying linear systems via Walsh functionsInternational Journal of Control, 1978
- Double Walsh series solution of first-order partial differential equationsInternational Journal of Systems Science, 1978
- Walsh series analysis in optimal controlInternational Journal of Control, 1975