Ebook: Control Theory for Linear Systems
- Tags: Control Robotics Mechatronics, Mechanical Engineering, Systems Theory Control
- Series: Communications and Control Engineering
- Year: 2001
- Publisher: Springer-Verlag London
- Edition: 1
- Language: English
- pdf
Control Theory for Linear Systems deals with the mathematical theory of feedback control of linear systems. It treats a wide range of control synthesis problems for linear state space systems with inputs and outputs. The book provides a treatment of these problems using state space methods, often with a geometric flavour. Its subject matter ranges from controllability and observability, stabilization, disturbance decoupling, and tracking and regulation, to linear quadratic regulation, H2 and H-infinity control, and robust stabilization. Each chapter of the book contains a series of exercises, intended to increase the reader's understanding of the material. Often, these exercises generalize and extend the material treated in the regular text.
Control Theory for Linear Systems deals with the mathematical theory of feedback control of linear systems. It treats a wide range of control synthesis problems for linear state space systems with inputs and outputs. The book provides a treatment of these problems using state space methods, often with a geometric flavour. Its subject matter ranges from controllability and observability, stabilization, disturbance decoupling, and tracking and regulation, to linear quadratic regulation, H2 and H-infinity control, and robust stabilization. Each chapter of the book contains a series of exercises, intended to increase the reader's understanding of the material. Often, these exercises generalize and extend the material treated in the regular text.
Control Theory for Linear Systems deals with the mathematical theory of feedback control of linear systems. It treats a wide range of control synthesis problems for linear state space systems with inputs and outputs. The book provides a treatment of these problems using state space methods, often with a geometric flavour. Its subject matter ranges from controllability and observability, stabilization, disturbance decoupling, and tracking and regulation, to linear quadratic regulation, H2 and H-infinity control, and robust stabilization. Each chapter of the book contains a series of exercises, intended to increase the reader's understanding of the material. Often, these exercises generalize and extend the material treated in the regular text.
Content:
Front Matter....Pages i-xv
Introduction....Pages 1-14
Mathematical preliminaries....Pages 15-35
Systems with inputs and outputs....Pages 37-73
Controlled invariant subspaces....Pages 75-106
Conditioned invariant Subspaces....Pages 107-124
(C, A, B)-pairs and dynamic Feedback....Pages 125-151
System zeros and the weakly unobservable subspace....Pages 153-173
System invertibility and the strongly reachable subspace....Pages 175-193
Tracking and regulation....Pages 195-209
Linear quadratic optimal control....Pages 211-235
The H 2 optimal control problem....Pages 237-261
H ? control and robustness....Pages 263-291
The state feedback H ? control problem....Pages 293-308
The H ?control problem with measurement feedback....Pages 309-329
Some applications of theH ?control problem....Pages 331-363
Back Matter....Pages 365-389
Control Theory for Linear Systems deals with the mathematical theory of feedback control of linear systems. It treats a wide range of control synthesis problems for linear state space systems with inputs and outputs. The book provides a treatment of these problems using state space methods, often with a geometric flavour. Its subject matter ranges from controllability and observability, stabilization, disturbance decoupling, and tracking and regulation, to linear quadratic regulation, H2 and H-infinity control, and robust stabilization. Each chapter of the book contains a series of exercises, intended to increase the reader's understanding of the material. Often, these exercises generalize and extend the material treated in the regular text.
Content:
Front Matter....Pages i-xv
Introduction....Pages 1-14
Mathematical preliminaries....Pages 15-35
Systems with inputs and outputs....Pages 37-73
Controlled invariant subspaces....Pages 75-106
Conditioned invariant Subspaces....Pages 107-124
(C, A, B)-pairs and dynamic Feedback....Pages 125-151
System zeros and the weakly unobservable subspace....Pages 153-173
System invertibility and the strongly reachable subspace....Pages 175-193
Tracking and regulation....Pages 195-209
Linear quadratic optimal control....Pages 211-235
The H 2 optimal control problem....Pages 237-261
H ? control and robustness....Pages 263-291
The state feedback H ? control problem....Pages 293-308
The H ?control problem with measurement feedback....Pages 309-329
Some applications of theH ?control problem....Pages 331-363
Back Matter....Pages 365-389
....
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