Optimal Control, Stabilization and Nonsmooth Analysis

Optimal Control, Stabilization and Nonsmooth Analysis

EnglishPaperback / softback
Springer, Berlin
EAN: 9783540213307
On order
Delivery on Monday, 10. of February 2025
CZK 3,949
Common price CZK 4,388
Discount 10%
pc
Do you want this product today?
Oxford Bookshop Praha Korunní
not available
Librairie Francophone Praha Štěpánská
not available
Oxford Bookshop Ostrava
not available
Oxford Bookshop Olomouc
not available
Oxford Bookshop Plzeň
not available
Oxford Bookshop Brno
not available
Oxford Bookshop Hradec Králové
not available
Oxford Bookshop České Budějovice
not available
Oxford Bookshop Liberec
not available

Detailed information

This edited book contains selected papers presented at the Louisiana Conference on Mathematical Control Theory (MCT'03), which brought together over 35 prominent world experts in mathematical control theory and its applications. The book forms a well-integrated exploration of those areas of mathematical control theory in which nonsmooth analysis is having a major impact. These include necessary and sufficient conditions in optimal control, Lyapunov characterizations of stability, input-to-state stability, the construction of feedback mechanisms, viscosity solutions of Hamilton-Jacobi equations, invariance, approximation theory, impulsive systems, computational issues for nonlinear systems, and other topics of interest to mathematicians and control engineers. The book has a strong interdisciplinary component and was designed to facilitate the interaction between leading mathematical experts in nonsmooth analysis and engineers who are increasingly using nonsmooth analytic tools.

EAN 9783540213307
ISBN 3540213309
Binding Paperback / softback
Publisher Springer, Berlin
Publication date April 20, 2004
Pages 361
Language English
Dimensions 235 x 155
Country Germany
Readership Professional & Scholarly
Illustrations XI, 361 p.
Editors de Queiroz, Marcio S.; Malisoff Michael; Wolenski Peter
Series Lecture Notes in Control and Information Sciences