Mathematical Control Theory II, 1st ed. 2015 Behavioral Systems and Robust Control Lecture Notes in Control and Information Sciences Series, Vol. 462
Coordonnateurs : Belur Madhu N., Camlibel M. Kanat, Rapisarda Paolo, Scherpen Jacquelien M.A.
This treatment of modern topics related to mathematical systems theory forms the proceedings of a workshop, Mathematical Systems Theory: From Behaviors to Nonlinear Control, held at the University of Groningen in July 2015. The workshop celebrated the work of Professors Arjan van der Schaft and Harry Trentelman, honouring their 60th Birthdays.
The second volume of this two-volume work covers a variety of topics related to behavioral systems and robust control. After giving a detailed account of the state-of the art in the related topic, each chapter presents new results and discusses new directions. As such, this volume provides a broad picture of the theory of behavioral systems and robust control for scientists and engineers with an interest in the interdisciplinary field of systems and control theory. The reader will benefit from the expert participants? ideas on exciting new approaches to control and system theory and their predictions of future directions for the subject that were discussed at the workshop.
Open Loop Control of Higher Order Systems.- Bilinear Differential Forms and the Loewner Framework for Rational Interpolation.- Noninteraction and Triangular Decoupling Using Geometric Control Theory and Transfer Matrices.- Simultaneous Stabilization Problem in a Behavioral Framework.- New Properties of ARE Solutions for Strictly Dissipative and Lossless Systems.- Stochastic Almost Output Synchronization for Time-Varying Networks of Non-Identical and Non-Introspective Agents Under External Stochastic Disturbances and Disturbances with Known Frequencies.- A Characterization of Solutions of the ARE and ARI.- Implementation of Behavioral Systems.- Synchronization of Linear Multi-Agent Systems with Input Nonlinearities via Dynamic Protocols.- Strong Structural Controllability of Networks.- Physical Network Systems and Model Reduction.- Interconnections of L2-Behaviors - Lumped Systems.- On State Observers – Take 2.- When is a Linear Complementarity System Disturbance Decoupled?.
Kanat Camlibel received the Ph.D. degree in mathematical theory of systems and control from Tilburg University, Tilburg, The Netherlands, in 2001. Currently, he is affiliated with Johann Bernoulli Institute for Mathematics and Computer Science, University of Groningen, Groningen, The Netherlands, where he served as an Assistant Professor between 2007 and 2013. From 2001 to 2007, he held Post-Doctoral/Assistant Professor positions with the University of Groningen, Tilburg University, and Eindhoven Technical University, Eindhoven, The Netherlands. His research interests include differential variational inequalities, complementarity problems, optimization, piecewise affine dynamical systems, switched linear systems, constrained linear systems, multi-agent systems, model reduction, and geometric theory of linear systems. Dr. Camlibel has published 40journa
Date de parution : 07-2015
Ouvrage de 255 p.
15.5x23.5 cm