Buscar
Mostrando ítems 11-20 de 3640
A weak maximum principle for optimal control problems with mixed constraints under a constant rank condition
(2020-09-01)
Necessary optimality conditions for optimal control problems with mixed state-control equality constraints are obtained. The necessary conditions are given in the form of a weak maximum principle and are obtained under (i) ...
Minimax optimal control problem with state constraints
(2016-11-01)
In this article, nondegenerate necessary conditions of optimality are derived and discussed for the so-called “minimax” optimal control problems with state constraints. In this class of problems, the data depends on an ...
Evaluation of choice functions to self-adaptive on constraint programming via the black hole algorithm
(Institute of Electrical and Electronics Engineers Inc., 2017)
Optimality conditions for infinite horizon control problems with state constraints
(Pergamon-Elsevier B.V. Ltd, 2009-12-15)
Necessary conditions of optimality in the form of a maximum principle are derived for state constrained optimal control problems with infinite horizon. A notable feature of our optimality conditions is the derivation of ...
Optimality conditions for infinite horizon control problems with state constraints
(Pergamon-Elsevier B.V. Ltd, 2009-12-15)
Necessary conditions of optimality in the form of a maximum principle are derived for state constrained optimal control problems with infinite horizon. A notable feature of our optimality conditions is the derivation of ...
W-RBAC - A workflow security model incorporating controlled overriding of constraints
(World Scientific Publ Co Pte LtdSingaporeSingapura, 2003)
Sufficient Optimality Conditions for Optimal Control Problems with State Constraints
(2019-06-11)
It is well-known in optimal control theory that the maximum principle, in general, furnishes only necessary optimality conditions for an admissible process to be an optimal one. It is also well-known that if a process ...
Augmented lagrangians with adaptive precision control for quadratic programming with equality constraints
(SpringerNew YorkEUA, 1999)