Internal and External Stabilization of Linear Systems with Constraints e-bog
1240,73 DKK
(inkl. moms 1550,91 DKK)
The analysis and design of linear systems is much easier than that of nonlinear systems; however, most real-world systems are an interconnection of linear and nonlinear components. A common paradigm of nonlinear systems is that they are linear systems with embedded or sandwiched nonlinear elements. More specifically, most nonlinear systems can be modeled as linear systems with constrains o...
E-bog
1240,73 DKK
Forlag
Birkhauser
Udgivet
21 juni 2012
Genrer
Cybernetics and systems theory
Sprog
English
Format
pdf
Beskyttelse
LCP
ISBN
9780817647872
The analysis and design of linear systems is much easier than that of nonlinear systems; however, most real-world systems are an interconnection of linear and nonlinear components. A common paradigm of nonlinear systems is that they are linear systems with embedded or sandwiched nonlinear elements. More specifically, most nonlinear systems can be modeled as linear systems with constrains on their inputs and selected outputs.Unifying two decades of research, this book is the first to establish a comprehensive foundation for a systematic analysis and design of linear systems with general state and input constraints. For such systems, the following issues are addressed in the work:* Internal or Lyapunov stability, external L_p stability, and simulatneous internal and external stability* Control system feedback design laws for different types of stability* New notions of external stability* Additional constraints on controller architecture under decentralized internal and external stabilization* Satisfactory performance, which also guarantees stabilityInternal and External Stabilization of Linear Systems with Constraints is an excellent reference for practicing engineers, graduate students, and researchers in control systems theory and design. The book may also serve as an advanced graduate text for a course or a seminar in nonlinear control systems theory and design in applied mathematics or engineering departments. Minimal prerequisites include a first graduate course in state-space methods as well as a first course in control systems design.