Adaptive control of parabolic PDEs

Adaptive control of parabolic PDEs / Andrey Smyshlyaevand Miroslav Krstic.

This book introduces a comprehensive methodology for adaptive control design of parabolic partial differential equations with unknown functional parameters, including reaction-convection-diffusion systems ubiquitous in chemical, thermal, biomedical, aerospace, and energy systems. Andrey Smyshlyaev a...

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Bibliographic Details
Main Authors: Smyshlyaev, Andrey (Author), Krstić, Miroslav (Author)
Format: eBook
Language:English
Published: Princeton : Princeton University Press, ©2010.
Subjects:
Differential equations, Parabolic.
Distributed parameter systems.
Adaptive control systems.
MATHEMATICS > Differential Equations > Partial.
MATHEMATICS > Applied.
Adaptive control systems
Differential equations, Parabolic
Distributed parameter systems
Online Access:Click for online access

MARC

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100 1 |a Smyshlyaev, Andrey,  |e author. 
245 1 0 |a Adaptive control of parabolic PDEs /  |c Andrey Smyshlyaevand Miroslav Krstic. 
260 |a Princeton :  |b Princeton University Press,  |c ©2010. 
300 |a 1 online resource (xiii, 328 pages) :  |b illustrations 
336 |a text  |b txt  |2 rdacontent 
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520 |a This book introduces a comprehensive methodology for adaptive control design of parabolic partial differential equations with unknown functional parameters, including reaction-convection-diffusion systems ubiquitous in chemical, thermal, biomedical, aerospace, and energy systems. Andrey Smyshlyaev and Miroslav Krstic develop explicit feedback laws that do not require real-time solution of Riccati or other algebraic operator-valued equations. The book emphasizes stabilization by boundary control and using boundary sensing for unstable PDE systems with an infinite relative degree. The book also ... 
504 |a Includes bibliographical references and index. 
505 0 |a Introduction -- Nonadaptive controllers. State feedback -- Closed-form controllers -- Observers -- Output feedback -- Control of complex-valued PDEs -- Adaptive schemes. Systemization of approaches to adaptive boundary stabilization of PDEs -- Lyapunov-based designs -- Certainty equivalence design with passive identifiers -- Certainty equivalence design with swapping identifiers -- State feedback for PDEs with spatially varying coefficients -- Closed-form adaptive output-feedback controllers -- Output feedback for PDEs with spatially varying coefficients -- Inverse optimal control -- Appendex A. Adaptive backstepping for nonlinear ODEs -- the basics -- Appendix B. Poincaré and Agmon inequalities -- Appendix C. Bessel functions -- Appendix D. Barbalat's and other lemmas for proving adaptive regulation -- Appendix E. Basic parabolic PDEs and their exact solution. 
588 0 |a Print version record. 
650 0 |a Differential equations, Parabolic. 
650 0 |a Distributed parameter systems. 
650 0 |a Adaptive control systems. 
650 7 |a MATHEMATICS  |x Differential Equations  |x Partial.  |2 bisacsh 
650 7 |a MATHEMATICS  |x Applied.  |2 bisacsh 
650 7 |a Adaptive control systems  |2 fast 
650 7 |a Differential equations, Parabolic  |2 fast 
650 7 |a Distributed parameter systems  |2 fast 
700 1 |a Krstić, Miroslav,  |e author. 
758 |i has work:  |a Adaptive control of parabolic PDEs (Text)  |1 https://id.oclc.org/worldcat/entity/E39PCGbQB3hhkrqkccGx8t4pRq  |4 https://id.oclc.org/worldcat/ontology/hasWork 
776 0 8 |i Print version:  |a Smyshlyaev, Andrey.  |t Adaptive control of parabolic PDEs.  |d Princeton : Princeton University Press, ©2010  |z 9780691142869  |w (DLC) 2009048242  |w (OCoLC)466341418 
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