Author	Foias, Ciprian. author
Title	Hโ-Control Theory [electronic resource] : Lectures given at the 2nd Session of the Centro Internazionale Matematico Estivo (C.I.M.E.) held in Como, Italy, June 18-26, 1990 / by Ciprian Foias, Bruce Francis, J. William Helton, Huibert Kwakernaak, J. Boyd Pearson ; edited by Edoardo Mosca, Luciano Pandolfi
Imprint	Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer, 1991
Connect to	http://dx.doi.org/10.1007/BFb0084465
Descript	VIII, 328 p. online resource

The fundamental problem in control engineering is to provide robust performance to uncertain plants. H -control theory began in the early eighties as an attempt to lay down rigorous foundations on the classical robust control requirements. It now turns out that H -control theory is at the crossroads of several important directions of research space or polynomial approach to control and classical interpolation theory; harmonic analysis and operator theory; minimax LQ stochastic control and integral equations. The book presents the underlying fundamental ideas, problems and advances through the pen of leading contributors to the field, for graduate students and researchers in both engineering and mathematics. From the Contents: C. Foias: Commutant Lifting Techniques for Computing Optimal H Controllers.- B.A. Francis: Lectures on H Control and Sampled-Data Systems.- J.W. Helton: Two Topics in Systems Engineering Frequency Domain Design and Nonlinear System.- H. Kwakernaak: The Polynomial Approach to H -Optimal Regulation.- J.B. Pearson: A Short Course in l - Optimal Control

Commutant lifting techniques for computing optimal H? controllers -- Lectures on H ? control and sampled-data systems -- Two topics in systems engineering: Frequency domain design and nonlinear systems -- The polynomial approach to H ?-optimal regulation -- Notes on l 1-optimal control -- On the hamiltonian structure in the computation of singular values for a class of Hankel operators -- Nehari interpolation problem for rational matrix functions: The generic case -- Time variant extension problems of Nehari type and the band method

1. Mathematics
2. Mathematical analysis
3. Analysis (Mathematics)
4. Applied mathematics
5. Engineering mathematics
6. System theory
7. Calculus of variations
8. Mathematics
9. Applications of Mathematics
10. Systems Theory
11. Control
12. Calculus of Variations and Optimal Control; Optimization
13. Analysis