Add to ORKGWe study soùe infinite-horizon optimization problems on spaces of periodic functions for non periodic Lagrangians. The main strategy relies on the reduction to finite horizon thanks in the introduction of an avering operator.We then provide existence results and necessary optimality conditions in which the corresponding averaged Lagrangian appears
This article concerns the derivation of necessary conditions of optimality for infinitehorizon contr...
Many real world problems with time-varying characteristic and unbounded horizon can be modeled as an...
The contributions of the thesis are in two parts. We first consider a periodic optimal control probl...
We study soùe infinite-horizon optimization problems on spaces of periodic functions for non periodi...
AbstractWe consider a general class of infinite-horizon optimization problems, where the phase space...
AbstractMonotonicity of optimal solutions to finite horizon dynamic optimization problems is used to...
Consider an infinite horizon, multi-dimensional optimization problem with arbitrary but finite perio...
In this paper, we make use of the Sobolev space W{1,1}ℝ+, ℝn to derive at once the Pontryagin condit...
We prove an existence and uniqueness result on periodic solutions of an infinite dimensional Riccati...
International audienceIn this paper, we make use of the Sobolev space W1,1 (R+,Rn) toderive at once ...
We establish necessary conditions of optimality for discrete-time infinite-horizon optimal control i...
This paper is devoted to the study of a one-dimensional optimal control problem of Lagrange type und...
International audienceThe method of periodic projections consists in iterating projections onto m cl...
AbstractOne important question in population models is whether periodic solutions exist and whether ...
The Yakubovich Frequency Theorem, in its periodic version and in its general nonautonomous extensio...
This article concerns the derivation of necessary conditions of optimality for infinitehorizon contr...
Many real world problems with time-varying characteristic and unbounded horizon can be modeled as an...
The contributions of the thesis are in two parts. We first consider a periodic optimal control probl...
We study soùe infinite-horizon optimization problems on spaces of periodic functions for non periodi...
AbstractWe consider a general class of infinite-horizon optimization problems, where the phase space...
AbstractMonotonicity of optimal solutions to finite horizon dynamic optimization problems is used to...
Consider an infinite horizon, multi-dimensional optimization problem with arbitrary but finite perio...
In this paper, we make use of the Sobolev space W{1,1}ℝ+, ℝn to derive at once the Pontryagin condit...
We prove an existence and uniqueness result on periodic solutions of an infinite dimensional Riccati...
International audienceIn this paper, we make use of the Sobolev space W1,1 (R+,Rn) toderive at once ...
We establish necessary conditions of optimality for discrete-time infinite-horizon optimal control i...
This paper is devoted to the study of a one-dimensional optimal control problem of Lagrange type und...
International audienceThe method of periodic projections consists in iterating projections onto m cl...
AbstractOne important question in population models is whether periodic solutions exist and whether ...
The Yakubovich Frequency Theorem, in its periodic version and in its general nonautonomous extensio...
This article concerns the derivation of necessary conditions of optimality for infinitehorizon contr...
Many real world problems with time-varying characteristic and unbounded horizon can be modeled as an...
The contributions of the thesis are in two parts. We first consider a periodic optimal control probl...