Title :
Robust identification from partial frequency data
Author :
Baratchart, L. ; Leblond, J. ; Torkhani, N. ; Partington, J.R.
Author_Institution :
Inst. Nat. de Recherche en Inf. et Autom., Sophia Antipolis, France
Abstract :
Being given noisy band-limited pointwise measurements of a function f belonging to the disc algebra, we provide a computational procedure to build an approximation which robustly converges to f on the range of frequencies (where the measurement points are assumed to be dense) as the number of data tends to ∞ and the l∞ noise level goes to 0, while staying within some Lipschitz-continuous tolerance from a given behaviour outside the bandwidth, f being assumed to meet this tolerance
Keywords :
algebra; approximation theory; convergence of numerical methods; function approximation; identification; Lipschitz-continuous tolerance; convergence; disc algebra; identification; noisy band-limited pointwise measurements; partial frequency data; robust identification; Algebra; Bandwidth; Frequency measurement; H infinity control; Linear programming; Mathematics; Noise level; Noise measurement; Noise robustness; Polynomials;
Conference_Titel :
Decision and Control, 1994., Proceedings of the 33rd IEEE Conference on
Conference_Location :
Lake Buena Vista, FL
Print_ISBN :
0-7803-1968-0
DOI :
10.1109/CDC.1994.411777
