A new approach to the parameter estimation of linear time-invariant delayed systems via modified Laguerre polynomials
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Publication:3713915
DOI10.1080/00207728508926770zbMath0586.93008OpenAlexW2039444227MaRDI QIDQ3713915
Rongyeu Chang, Kun-Chou Chen, Mawling Wang
Publication date: 1985
Published in: International Journal of Systems Science (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00207728508926770
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Related Items (5)
A State Feedback Control Design for Generalized Fractional Systems Through Orthogonal Functions: Application to a Fractional Inverted Pendulum ⋮ Block-pulse function approach to the identification of MIMO-systems and time-delay systems ⋮ Analysis of time-delay systems via shifted Chebyshev polynomials of the first and second kinds ⋮ Analysis of time-delay systems using an alternative technique ⋮ Parameter identification of time-delay systems via exponential
Cites Work
- Walsh operational matrices for fractional calculus and their application to distributed systems
- Quasilinearization and the estimation of time lags
- A theorem on duality between estimation and control for linear stochastic systems with time delay
- Determination of a dynamical model for time-lag systems using a second- order method
- Solution and Parameter Estimation in Linear Time-Invariant Delayed Systems Using Laguerre Polynomial Expansion
- Solutions of integral equations via modified Laguerre polynomials
- Parameter Estimation of Delay Systems Via Block Pulse Functions
- Laguerre operational matrices for fractional calculus and applications
- Explicit solution of a class of delay-differential equations
- Identification of linear systems with time-delay operating in a closed loop in the presence of noise
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