International audienceThe aim of this paper is to study two classes of discontinuous control problems without any convexity assumption on the dynamics. In the first part we characterize the value function for the Mayer problem and the supremum cost problem using viscosity tools and the notion of ε-viability (near viability). These value functions are given with respect to discontinuous cost functionals. In the second part we obtain results describing the ε-viability (near viability) of singularly perturbed control systems
In this article, we present a proper extension of the problems of classical calculus of variations a...
The paper deals with deterministic optimal control problems with state constraints and non-linear dy...
An open problem concerning the convergence of the optimal cost for the cheap control problem without...
AbstractWe study two classes of stochastic control problems with semicontinuous cost: the Mayer prob...
International audienceWe study two classes of stochastic control problems with semicontinuous cost: ...
We consider a nonconvex and unbounded differential inclusion derived from a control system whose con...
We study optimal stopping time problems with a discontinuous stopping cost ??. When ?? is upper semi...
This paper deals with Mayer's problem for control systems with state constraints and, possibly, dis...
In a series of papers, we presented new theorems characterizing the value function in optimal contro...
In this paper we explain that various (possibly discontinuous) value functions for optimal control p...
We discuss first order optimality conditions for state constrained optimal control problems. Our con...
International audienceThis paper aims at studying a class of discontinuous deterministic control pro...
We introduce a Boundary Value Problem, (BVP), for a class of Hamilton– Jacobi–Bellman equations with...
summary:This paper presents a theoretical approach to optimal control problems (OCPs) governed by a ...
We study viscosity solutions of Hamilton-Jacobi equations that arise in optimal control problems wit...
In this article, we present a proper extension of the problems of classical calculus of variations a...
The paper deals with deterministic optimal control problems with state constraints and non-linear dy...
An open problem concerning the convergence of the optimal cost for the cheap control problem without...
AbstractWe study two classes of stochastic control problems with semicontinuous cost: the Mayer prob...
International audienceWe study two classes of stochastic control problems with semicontinuous cost: ...
We consider a nonconvex and unbounded differential inclusion derived from a control system whose con...
We study optimal stopping time problems with a discontinuous stopping cost ??. When ?? is upper semi...
This paper deals with Mayer's problem for control systems with state constraints and, possibly, dis...
In a series of papers, we presented new theorems characterizing the value function in optimal contro...
In this paper we explain that various (possibly discontinuous) value functions for optimal control p...
We discuss first order optimality conditions for state constrained optimal control problems. Our con...
International audienceThis paper aims at studying a class of discontinuous deterministic control pro...
We introduce a Boundary Value Problem, (BVP), for a class of Hamilton– Jacobi–Bellman equations with...
summary:This paper presents a theoretical approach to optimal control problems (OCPs) governed by a ...
We study viscosity solutions of Hamilton-Jacobi equations that arise in optimal control problems wit...
In this article, we present a proper extension of the problems of classical calculus of variations a...
The paper deals with deterministic optimal control problems with state constraints and non-linear dy...
An open problem concerning the convergence of the optimal cost for the cheap control problem without...