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Nonlinear and Optimal Control Theory: Lectures Given at the C.I.M.E. Summer School Held in Cetraro, Italy, June 19-29, 2004 2008 Edition
Contributor(s): Agrachev, Andrei A. (Author), Nistri, Paolo (Editor), Morse, A. Stephen (Author)
ISBN: 3540776443     ISBN-13: 9783540776444
Publisher: Springer
OUR PRICE:   $66.49  
Product Type: Paperback - Other Formats
Published: March 2008
Qty:
Additional Information
BISAC Categories:
- Mathematics | Applied
- Mathematics | Differential Equations - General
- Mathematics | Geometry - Differential
Dewey: 629.836
LCCN: 2007943246
Series: Lecture Notes in Mathematics
Physical Information: 0.9" H x 6.1" W x 9.2" (1.25 lbs) 360 pages
 
Descriptions, Reviews, Etc.
Publisher Description:
Mathematical Control Theory is a branch of Mathematics having as one of its main aims the establishment of a sound mathematical foundation for the c- trol techniques employed in several di?erent ?elds of applications, including engineering, economy, biologyandsoforth. Thesystemsarisingfromthese- plied Sciences are modeled using di?erent types of mathematical formalism, primarily involving Ordinary Di?erential Equations, or Partial Di?erential Equations or Functional Di?erential Equations. These equations depend on oneormoreparameters thatcanbevaried, andthusconstitute thecontrol - pect of the problem. The parameters are to be chosen soas to obtain a desired behavior for the system. From the many di?erent problems arising in Control Theory, the C. I. M. E. school focused on some aspects of the control and op- mization ofnonlinear, notnecessarilysmooth, dynamical systems. Two points of view were presented: Geometric Control Theory and Nonlinear Control Theory. The C. I. M. E. session was arranged in ?ve six-hours courses delivered by Professors A. A. Agrachev (SISSA-ISAS, Trieste and Steklov Mathematical Institute, Moscow), A. S. Morse (Yale University, USA), E. D. Sontag (Rutgers University, NJ, USA), H. J. Sussmann (Rutgers University, NJ, USA) and V. I. Utkin (Ohio State University Columbus, OH, USA). We now brie?y describe the presentations. Agrachev's contribution began with the investigation of second order - formation in smooth optimal control problems as a means of explaining the variational and dynamical nature of powerful concepts and results such as Jacobi ?elds, Morse's index formula, Levi-Civita connection, Riemannian c- vature.