For more than forty years, the equation y'(t) = Ay(t) + u(t) in Banach spaces has been used as model for optimal control processes described by partial differential equations, in particular heat and diffusion processes. Many of the outstanding open problems, however, have remained open until recently, and some have never been solved. This book is a survey of all results know to the author, with emphasis on very recent results (1999 to date).
The book is restricted to linear equations and two particular problems (the time optimal problem, the norm optimal problem) which results in a more focused and concrete treatment. As experience shows, results on linear equations are the basis for the treatment of their semilinear counterparts, and techniques for the time and norm optimal problems can often be generalized to more general cost functionals.
The main object of this book is to be a state-of-the-art monograph on the theory of the time and norm optimal controls for y'(t) = Ay(t) + u(t) that ends at the very latest frontier of research, with open problems and indications for future research.
Key features:
* Applications to optimal diffusion processes.
* Applications to optimal heat propagation processes.
* Modelling of optimal processes governed by partial
differential equations.
* Complete bibliography.
* Includes the latest research on the subject.
* Does not assume anything from the reader except
basic functional analysis.
* Accessible to researchers and advanced graduate
students alike
- ISBN10 0080457347
- ISBN13 9780080457345
- Publish Date 28 May 2014 (first published 1 January 2005)
- Publish Status Active
- Publish Country NL
- Imprint North-Holland
- Format eBook
- Pages 333
- Language English