We investigate the value function V:R+×Rn→R+∪{+∞}of the infinite horizon problem in optimal control for a general—not necessarily discounted—running cost and provide sufficient conditions for its lower semicontinuity, continuity, and local Lipschitz regularity. Then we use the continuity of V(t, ·)to prove a relaxation theorem and to write the first order necessary optimality conditions in the form of a, possibly abnormal, maximum principle whose transversality condition uses limiting/horizontal supergradients of V(0, ·)at the initial point. When V(0, ·)is merely lower semicontinuous, then for a dense subset of initial conditions we obtain a normal maximum principle augmented by sensitivity relations involving the Fréchet subdifferentials o...
The paper deals with first order necessary optimality conditions for a class of infinite-horizon opt...
We prove that for the standard linear-quadratic optimal control problems with in-finite horizon, the...
This paper extends optimal control theory to a class of infinite-horizon problems that arise in stud...
We investigate the value function V:R+×Rn→R+∪{+∞}of the infinite horizon problem in optimal control ...
International audienceWe investigate the value function V : R+ × R n → R+ ∪ {+∞} of the infinite hor...
This paper investigates a relationship between the maximum princi-ple with an infinite horizon and d...
International audienceThis paper investigates sufficient conditions for Lipschitz regularity of the ...
The paper deals with first order necessary optimality conditions for a class of infinite-horizon opt...
Partial and full sensitivity relations are obtained for nonautonomous optimal control problems with ...
This paper investigates the relationship between the maximum principle with an infinite horizon and ...
The paper revisits the issue of necessary optimality conditions for infinitehorizon optimal control ...
This paper suggests some further developments in the theory of first-order necessary optimality cond...
The paper revisits the issue of necessary optimality conditions for infinite horizon optimal control...
In this paper we consider nonautonomous optimal control problems of infinite horizon type, whose con...
Necessary conditions of optimality in the form of a maximum principle are derived for state constrai...
The paper deals with first order necessary optimality conditions for a class of infinite-horizon opt...
We prove that for the standard linear-quadratic optimal control problems with in-finite horizon, the...
This paper extends optimal control theory to a class of infinite-horizon problems that arise in stud...
We investigate the value function V:R+×Rn→R+∪{+∞}of the infinite horizon problem in optimal control ...
International audienceWe investigate the value function V : R+ × R n → R+ ∪ {+∞} of the infinite hor...
This paper investigates a relationship between the maximum princi-ple with an infinite horizon and d...
International audienceThis paper investigates sufficient conditions for Lipschitz regularity of the ...
The paper deals with first order necessary optimality conditions for a class of infinite-horizon opt...
Partial and full sensitivity relations are obtained for nonautonomous optimal control problems with ...
This paper investigates the relationship between the maximum principle with an infinite horizon and ...
The paper revisits the issue of necessary optimality conditions for infinitehorizon optimal control ...
This paper suggests some further developments in the theory of first-order necessary optimality cond...
The paper revisits the issue of necessary optimality conditions for infinite horizon optimal control...
In this paper we consider nonautonomous optimal control problems of infinite horizon type, whose con...
Necessary conditions of optimality in the form of a maximum principle are derived for state constrai...
The paper deals with first order necessary optimality conditions for a class of infinite-horizon opt...
We prove that for the standard linear-quadratic optimal control problems with in-finite horizon, the...
This paper extends optimal control theory to a class of infinite-horizon problems that arise in stud...