International audienceWe consider a class of exit--time control problems for nonlinear systems with a nonnegative vanishing Lagrangian. In general, the associated PDE may have multiple solutions, and known regularity and stability properties do not hold. In this paper we obtain such properties and a uniqueness result under some explicit sufficient conditions. We briefly investigate also the infinite horizon problem
AbstractWe consider the value function V of optimal control problems with exit time. Under suitable ...
In a series of papers, we characterized the value function in optimal control as the unique viscosit...
We study a class of infinite horizon and exit-time control problems for nonlinear systems with unbou...
International audienceWe consider a class of exit--time control problems for nonlinear systems with ...
The research on a class of asymptotic exit-time problems with a vanishing Lagrangian, is extended he...
In a series of papers, we proved theorems characterizing the value function in exit time optimal con...
In a series of papers, we proved theorems characterizing the value function in exit time optimal co...
In this study, an attempt is made to prove that the value function for a class of problems including...
Given a control system (formulated as a nonconvex and unbounded differential inclusion) we study the...
We study the Hamilton-Jacobi-Bellman equation for undiscounted exit time optimal control problems fo...
We prove semiconcavity of the value function of a nonlinear optimal control problem where the cost f...
We study the Hamilton-Jacobi equation for undiscounted exit time control problems with general nonne...
The authors study the connections between deterministic exit time control problems and possibly disc...
In a series of papers, we presented new theorems characterizing the value function in optimal contro...
This study is a continuation of a work on uniqueness questions for viscosity solutions of Hamilton-J...
AbstractWe consider the value function V of optimal control problems with exit time. Under suitable ...
In a series of papers, we characterized the value function in optimal control as the unique viscosit...
We study a class of infinite horizon and exit-time control problems for nonlinear systems with unbou...
International audienceWe consider a class of exit--time control problems for nonlinear systems with ...
The research on a class of asymptotic exit-time problems with a vanishing Lagrangian, is extended he...
In a series of papers, we proved theorems characterizing the value function in exit time optimal con...
In a series of papers, we proved theorems characterizing the value function in exit time optimal co...
In this study, an attempt is made to prove that the value function for a class of problems including...
Given a control system (formulated as a nonconvex and unbounded differential inclusion) we study the...
We study the Hamilton-Jacobi-Bellman equation for undiscounted exit time optimal control problems fo...
We prove semiconcavity of the value function of a nonlinear optimal control problem where the cost f...
We study the Hamilton-Jacobi equation for undiscounted exit time control problems with general nonne...
The authors study the connections between deterministic exit time control problems and possibly disc...
In a series of papers, we presented new theorems characterizing the value function in optimal contro...
This study is a continuation of a work on uniqueness questions for viscosity solutions of Hamilton-J...
AbstractWe consider the value function V of optimal control problems with exit time. Under suitable ...
In a series of papers, we characterized the value function in optimal control as the unique viscosit...
We study a class of infinite horizon and exit-time control problems for nonlinear systems with unbou...