Email this article Exact gradient controllability with strategic actuators
- Authors: El Harraki I.1, Khazari A.2, Boutoulout A.3
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Affiliations:
- Ecole Nationale Supérieure des Mines de Rabat
- National School of Business and Management
- Department of Mathematics and Computer Science, Laboratory of Modeling Analysis and Control Systems, Faculty of Science
- Issue: Vol 51, No 6 (2017)
- Pages: 377-390
- Section: Article
- URL: https://journal-vniispk.ru/0146-4116/article/view/174954
- DOI: https://doi.org/10.3103/S0146411617060037
- ID: 174954
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Abstract
In this paper, we develop results related to the gradient controllability and actuators. The concept of gradient strategic actuators is characterized and applied to the gradient controllability of systems described by a hyperbolic equation. This emphasizes the spatial structure and the location of the actuator in order to achieve the gradient controllability. We combine the Hilbert uniqueness method and the characterization of the strategic actuators to solve the gradient controllability problem for the wave equation. The developed results are illustrated by many examples of specific shapes and systems.
About the authors
I. El Harraki
Ecole Nationale Supérieure des Mines de Rabat
Email: boutouloutali@Yahoo.fr
Morocco, Rabat
A. Khazari
National School of Business and Management
Email: boutouloutali@Yahoo.fr
Morocco, Fez
A. Boutoulout
Department of Mathematics and Computer Science, Laboratory of Modeling Analysis and Control Systems, Faculty of Science
Author for correspondence.
Email: boutouloutali@Yahoo.fr
Morocco, Meknes
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