In a series of papers, we proved theorems characterizing the value function in exit time optimal control as the unique viscosity solution of the corresponding Bellman equation that satis es appropriate side conditions. The results applied to problems which satisfy a positivity condition on the integral of the Lagrangian. This positive integral condition assigned a positive cost to remaining outside the target on any interval of positive length. In this note, we prove a new theorem which characterizes the exit time value function as the unique bounded-from-below viscosity solution of the Bellman equation that vanishes on the target. The theorem applies to problems satisfying an asymptotic condition on the trajectories, including case...
We study optimal stopping time problems with a discontinuous stopping cost ??. When ?? is upper semi...
Given a control system (formulated as a nonconvex and unbounded differential inclusion) we study the...
We study viscosity solutions of Hamilton-Jacobi equations that arise in optimal control problems wit...
In a series of papers, we proved theorems characterizing the value function in exit time optimal con...
In this study, an attempt is made to prove that the value function for a class of problems including...
In a series of papers, we presented new theorems characterizing the value function in optimal contro...
We study the Hamilton-Jacobi-Bellman equation for undiscounted exit time optimal control problems fo...
This study is a continuation of a work on uniqueness questions for viscosity solutions of Hamilton-J...
This work is devoted to the study of Hamilton-Jacobi-Bellman equations (HJBs) for a large class of u...
We study the Bellman equation for undiscounted exit time optimal control problems with fully nonline...
In a series of papers, we characterized the value function in optimal control as the unique viscosit...
We study the Hamilton-Jacobi equation for undiscounted exit time control problems with general nonne...
We consider a class of exit–time control problems for nonlinear systems with a nonnegative vanishing...
The authors study the connections between deterministic exit time control problems and possibly disc...
We study the Hamilton-Jacobi equation for undiscounted exit time control problems with general nonne...
We study optimal stopping time problems with a discontinuous stopping cost ??. When ?? is upper semi...
Given a control system (formulated as a nonconvex and unbounded differential inclusion) we study the...
We study viscosity solutions of Hamilton-Jacobi equations that arise in optimal control problems wit...
In a series of papers, we proved theorems characterizing the value function in exit time optimal con...
In this study, an attempt is made to prove that the value function for a class of problems including...
In a series of papers, we presented new theorems characterizing the value function in optimal contro...
We study the Hamilton-Jacobi-Bellman equation for undiscounted exit time optimal control problems fo...
This study is a continuation of a work on uniqueness questions for viscosity solutions of Hamilton-J...
This work is devoted to the study of Hamilton-Jacobi-Bellman equations (HJBs) for a large class of u...
We study the Bellman equation for undiscounted exit time optimal control problems with fully nonline...
In a series of papers, we characterized the value function in optimal control as the unique viscosit...
We study the Hamilton-Jacobi equation for undiscounted exit time control problems with general nonne...
We consider a class of exit–time control problems for nonlinear systems with a nonnegative vanishing...
The authors study the connections between deterministic exit time control problems and possibly disc...
We study the Hamilton-Jacobi equation for undiscounted exit time control problems with general nonne...
We study optimal stopping time problems with a discontinuous stopping cost ??. When ?? is upper semi...
Given a control system (formulated as a nonconvex and unbounded differential inclusion) we study the...
We study viscosity solutions of Hamilton-Jacobi equations that arise in optimal control problems wit...