In this paper we consider the zero-sum, infinite-horizon, linear quadratic differential game. We derive sufficient conditions for the existence of (almost) equilibria as well as necessary conditions. Contrary to all classical references we allow for singular weighting on the minimizing player in the cost criterion. It turns out that this problem has a strong relation with the singularH 8 problem with state feedback, i.e., theH 8 problem where the direct feedthrough matrix from control input to output is not necessarily injective
It is well known that finding Nash equilibrium solutions of nonzero-sum differential games is a chal...
SUMMARY. This paper considers the problem of finding optimal strategies, with two players, based on ...
We consider the zero-endpoint infinite-horizon LQ problem. We show that the existence of an optimal ...
In this paper we consider the zero-sum, infinite-horizon, linear quadratic differential game. We der...
In this paper we consider the time-invariant, finite-dimensional, infinite-horizon, linear quadratic...
A finite-horizon two-person non-zero-sum differential game is considered. The dynamics of the game i...
International audienceAs in optimal control theory, linear quadratic (LQ) differential games (DG) ca...
We consider linear-quadratic, two-person, zero-sum perfect information differential games, possibly ...
In this note, we consider the non-cooperative linear feedback Nash quadratic differential game with ...
Abstract- In this paper, we study the infinite horizon zero-sum differential games for both standard...
Abstract. The object of this paper is to revisit the results of P. Bernhard (J. Optim. Theory Appl. ...
In this work, a finite-horizon zero-sum linear-quadratic differential game, modeling a pursuit-evasi...
A new approach to two-player zero-sum differential games with convex-concave cost function is presen...
AbstractThis paper proves that the feedback controls synthesizing the equilibrium solutions to linea...
We study a selection method for a Nash feedback equilibrium of a one-dimensional linear-quadratic no...
It is well known that finding Nash equilibrium solutions of nonzero-sum differential games is a chal...
SUMMARY. This paper considers the problem of finding optimal strategies, with two players, based on ...
We consider the zero-endpoint infinite-horizon LQ problem. We show that the existence of an optimal ...
In this paper we consider the zero-sum, infinite-horizon, linear quadratic differential game. We der...
In this paper we consider the time-invariant, finite-dimensional, infinite-horizon, linear quadratic...
A finite-horizon two-person non-zero-sum differential game is considered. The dynamics of the game i...
International audienceAs in optimal control theory, linear quadratic (LQ) differential games (DG) ca...
We consider linear-quadratic, two-person, zero-sum perfect information differential games, possibly ...
In this note, we consider the non-cooperative linear feedback Nash quadratic differential game with ...
Abstract- In this paper, we study the infinite horizon zero-sum differential games for both standard...
Abstract. The object of this paper is to revisit the results of P. Bernhard (J. Optim. Theory Appl. ...
In this work, a finite-horizon zero-sum linear-quadratic differential game, modeling a pursuit-evasi...
A new approach to two-player zero-sum differential games with convex-concave cost function is presen...
AbstractThis paper proves that the feedback controls synthesizing the equilibrium solutions to linea...
We study a selection method for a Nash feedback equilibrium of a one-dimensional linear-quadratic no...
It is well known that finding Nash equilibrium solutions of nonzero-sum differential games is a chal...
SUMMARY. This paper considers the problem of finding optimal strategies, with two players, based on ...
We consider the zero-endpoint infinite-horizon LQ problem. We show that the existence of an optimal ...