Optimal Control of Finite and Infinite Dimensional Dynamic Systems and their Applications
|
Organizer(s): |
Name:
|
Affiliation:
|
Country:
|
Nasir U. Ahmed
|
University of Ottawa
|
Canada
|
Stanislaw Migorski
|
Jagellonian University
|
Poland
|
Saroj K. Biswas
|
Temple University
|
USA
|
|
|
|
|
|
|
|
|
Abstract:
| | The subject of optimal control is as extensive and as diverse as dynamic systems governed by Ordinary Differential Equations, Partial Differential Equations, Abstract Differential Equations, Stochastic Differential Equations, and their Functional counter parts defined on finite and infinite dimensional Banach and Topological spaces. Over the last six decades, there has been phenomenal development of control theory on more and more complex systems, and it seems it will continue with increasing interest. This field is mathematically very rich and employs almost every aspect of topology and functional analysis. Since the publication of Pontryagin Maximum Principle in the late fifties, the subject on optimal control has expanded in every possible direction of concern to humanity. Optimal Control theory has been already applied extensively in Engineering and Physical sciences, Social Sciences, and Global Computer Communication Networks etc. In recent years, there has been increasing thrusts in other directions, such as Biological Sciences and Medicine which are likely to make breakthroughs in the future.
This session welcomes all papers concerned with theoretical development of optimal controls, their computational complexities as well as their applications in all areas of Physical and Social Sciences. |
|
|
List of approved abstract |
|
|
|
|
