论文信息 - Optimal worst case estimation for LPV-FIR models with bounded errors

Optimal worst case estimation for LPV-FIR models with bounded errors

In this paper discrete time linear parameter varying (LPV) models with finite impulse response (FIR) dynamic structure are considered. Measurement errors are assumed to be bounded and in such condition the worst case parameter estimate errors are derived together with the input sequences that allow their determination. The main result of the paper shows that the optimal input design of LPV-FIR models is achieved by combining the available results on optimal input design for invariant FIR models with the results on optimal input design for static blocks.

G. Belforte | P. Gay

[1] G. Belforte,et al. Optimal input design for worst-case system identification in l 1 /l 2 /l ∞ , 1993 .

[2] G. Belforte,et al. Optimal sampling schedule for parameter estimation of linear models with unknown but bounded measurement errors , 1987 .

[3] Dapeng Xiong,et al. Set-valued methods for linear parameter varying systems, , 1999, Autom..

[4] C. Micchelli. Optimal Sampling Design for Parameter Estimation and P-Widths under Stochastic and Deterministic Noise , 1989 .

[5] Gustavo Belforte,et al. Optimal sampling schedule for models with l_2 and l_infinite set membeship errors , 1997 .

[6] R. Ravikanth,et al. Identification of linear parametrically varying systems , 1995, Proceedings of 1995 34th IEEE Conference on Decision and Control.

[7] R. Tempo,et al. Optimal algorithms theory for robust estimation and prediction , 1985 .

[8] K. Osipenko,et al. Best approximation of functions specified with an error at a finite number of points , 1975 .

[9] G. Belforte,et al. some new properties of Chebyshev polynomials , 2000 .

[10] Lawton H. Lee,et al. Identification of Linear Parameter-Varying Systems Using Nonlinear Programming , 1999 .