In this work, an optimal control problem with state constraints of equality type is considered. Novelty of the problem formulation is justified. Under various regularity assumptions imposed on the optimal trajectory, a non-degenerate Pontryagin Maximum Principle is proven. As a consequence of the maximum principle, the Euler–Lagrange and Legendre conditions for a variational problem with equality and inequality state constraints are obtained. As an application, the equation of the geodesic curve for a complex domain is derived. In control theory, the Maximum Principle suggests the global maximum condition, also known as the Weierstrass–Pontryagin maximum condition, due to which the optimal control function, at each instant of time, turns ou...
In this paper, we consider a class of optimal control problems governed by a differential system. We...
AbstractWe derive a second-order necessary condition for optimal control problems defined by ordinar...
We consider cost minimising control problems, in which the dynamical system is constrained by higher...
In this work, an optimal control problem with state constraints of equality type is considered. Nove...
We consider an optimal control problem with equality state constraints. We prove nondegenerate neces...
A new method to prove non-degenerate optimality conditions in optimal control problems with state co...
AbstractOptimality conditions are derived in the form of a maximum principle governing solutions to ...
In this paper we study the degeneracy phenomenon arising in optimal control problems with state cons...
International audienceIn this paper we investigate normal and nondegenerate forms of the maximum pri...
A maximum principle in the form given by R. V. Gamkrelidze is obtained, although without a priori re...
Necessary conditions of optimality are derived for optimal control problems with pathwise state cons...
For optimal control problems involving ordinary differential equations and functional inequality sta...
Artigo em fase de publicaçãoWe address necessary conditions of optimality (NCO), in the form of a m...
We discuss the evolution of the Pontryagin maximum principle, focusing primarily on the hypotheses r...
Necessary optimality conditions in optimal control problems with state constraints in the form of Po...
In this paper, we consider a class of optimal control problems governed by a differential system. We...
AbstractWe derive a second-order necessary condition for optimal control problems defined by ordinar...
We consider cost minimising control problems, in which the dynamical system is constrained by higher...
In this work, an optimal control problem with state constraints of equality type is considered. Nove...
We consider an optimal control problem with equality state constraints. We prove nondegenerate neces...
A new method to prove non-degenerate optimality conditions in optimal control problems with state co...
AbstractOptimality conditions are derived in the form of a maximum principle governing solutions to ...
In this paper we study the degeneracy phenomenon arising in optimal control problems with state cons...
International audienceIn this paper we investigate normal and nondegenerate forms of the maximum pri...
A maximum principle in the form given by R. V. Gamkrelidze is obtained, although without a priori re...
Necessary conditions of optimality are derived for optimal control problems with pathwise state cons...
For optimal control problems involving ordinary differential equations and functional inequality sta...
Artigo em fase de publicaçãoWe address necessary conditions of optimality (NCO), in the form of a m...
We discuss the evolution of the Pontryagin maximum principle, focusing primarily on the hypotheses r...
Necessary optimality conditions in optimal control problems with state constraints in the form of Po...
In this paper, we consider a class of optimal control problems governed by a differential system. We...
AbstractWe derive a second-order necessary condition for optimal control problems defined by ordinar...
We consider cost minimising control problems, in which the dynamical system is constrained by higher...