Error Estimates for the Approximation of a Class of Optimal Control Systems Governed by Linear PDEs
Abstract
This paper deals with a class of optimal control problems in which the system is governed by a linear partial differential equation and the control is distributed and with constraints. The problem is posed in the framework of the theory of optimal control of systems. A numerical method is proposed to approximate the optimal control. In this method, the state space as well as the convex set of admissible controls are discretized. An abstract error estimate for the optimal control problem is obtained that depends on both the approximation of the state equation and the space of controls. This theoretical result is illustrated by some numerical examples from the literature.
Más información
Título según WOS: | Error Estimates for the Approximation of a Class of Optimal Control Systems Governed by Linear PDEs |
Título según SCOPUS: | Error estimates for the approximation of a class of optimal control systems governed by linear PDEs |
Título de la Revista: | NUMERICAL FUNCTIONAL ANALYSIS AND OPTIMIZATION |
Volumen: | 30 |
Número: | 05-jun |
Editorial: | TAYLOR & FRANCIS INC |
Fecha de publicación: | 2009 |
Página de inicio: | 523 |
Página final: | 547 |
Idioma: | English |
URL: | http://www.tandfonline.com/doi/abs/10.1080/01630560902987931 |
DOI: |
10.1080/01630560902987931 |
Notas: | ISI, SCOPUS |