Document Zbl 0825.93206

Predictive control of nonlinear dynamic processes. (English) Zbl 0825.93206

Appl. Math. Comput. 70, No. 2-3, 169-184 (1995).

MSC:

93B51	Design techniques (robust design, computer-aided design, etc.)
93C10	Nonlinear systems in control theory
93C55	Discrete-time control/observation systems
49N10	Linear-quadratic optimal control problems
34K35	Control problems for functional-differential equations

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[2]	Clarke, D. W.; Mohtadi, C.; Tuffs, P. S., Generalized predictive control—Part 1. The basic algorithm, Automatica, 23, 2, 137-148 (1987) · Zbl 0621.93032
[3]	Haber, R.; Keviczky, L., Identification of nonlinear dynamic systems—Survey paper, (Prepr. 4th IFAC Symposium on Identification and System Parameter Estimation. Prepr. 4th IFAC Symposium on Identification and System Parameter Estimation, Tbilisi, USSR (1976)), 62-112
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[7]	Haber, R., Transformation of the absolute descriptions of linear and nonlinear processes to their incremental forms, Internat. J. Systems Sci., 23, 6, 935-955 (1993) · Zbl 0757.93053
[8]	Bars, R.; Haber, R., Long-range predictive control of nonlinear systems on the basis of the Hammerstein model, (Prepr. 3rd IFAC Symposium on Adaptive Systems in Control and Signal Processing. Prepr. 3rd IFAC Symposium on Adaptive Systems in Control and Signal Processing, Glasgow, UK (1989)), 675-679
[9]	Haber, R.; Bars, R.; Pataki, A., One-step and long-range predictive control of nonlinear systems described by the nonparametric Volterra model, (Prepr. IFAC Symposium on Nonlinear Control Systems Design. Prepr. IFAC Symposium on Nonlinear Control Systems Design, Capri, Italy (1989)), 64-69
[10]	Bars, R.; Haber, R., Weighted one-step-ahead adaptive predictive control of nonlinear processes, (Prepr. IMACS Symposium Modelling and Control of Technological Processes. Prepr. IMACS Symposium Modelling and Control of Technological Processes, Lille, France (1991)), 16-21 · Zbl 0818.93035

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