International audienceIn this paper, we consider a delay differential inclusion ˙ x(t) ∈ F (t, xt), where xt denotes the history function of x(t) along an interval of time. We extend the celebrated Filippov's theorem to this case. Then, we further generalize this theorem to the case when the state variable x is constrained to the closure of an open subset K ⊂ R n. Under a new "inward pointing condition", we give a relaxation result stating that the set of trajectories lying in the interior of the state constraint is dense in the set of constrained trajectories of the convexified inclusion ˙ x(t) ∈ co F (t, xt)
This paper studies a general optimal control problem for nonconvex delay-differential inclusions wit...
In the paper we study weak and strong invariance of differential inclusions with fixed time impulses...
Abstract In this paper we prove two variants of the well-known Filippov-Pliss lemma in the case of d...
In this paper, we extend the celebrated Filippov's theorem to delay differential inclusion in n-dime...
International audienceIn this paper we consider a state constrained differential inclusion ˙ x ∈ Ax ...
International audienceIn this paper, we consider a nonconvex differential inclusion with constant de...
In this paper, a mathematical model of the control object in the form of a differential inclusion wi...
AbstractThe celebrated Filippov's theorem implies that, given a trajectory x1:[0, +∞[↦Rn of a differ...
In this paper the authors consider the problem of finding Filippov estimates when suitable state con...
The celebrated Filippov's theorem implies that, given a trajectory x(1) : [0, + infinity[ \-> R-n of...
. In this paper we consider parametric nonlinear evolution inclusions driven by time-dependent subdi...
In this paper we provide a relaxation result for control systems under both equality and inequality ...
summary:A certain converse statement of the Filippov-Wa\v zewski theorem is proved. This result exte...
AbstractWe consider the following integral-inclusion x(t) = ∫taƒ(t, s, u(s), u(t − d1), ..., u(t − d...
The paper deals with solutions of a differential inclusion x ̇ ∈ F (x) constrained to a compact con...
This paper studies a general optimal control problem for nonconvex delay-differential inclusions wit...
In the paper we study weak and strong invariance of differential inclusions with fixed time impulses...
Abstract In this paper we prove two variants of the well-known Filippov-Pliss lemma in the case of d...
In this paper, we extend the celebrated Filippov's theorem to delay differential inclusion in n-dime...
International audienceIn this paper we consider a state constrained differential inclusion ˙ x ∈ Ax ...
International audienceIn this paper, we consider a nonconvex differential inclusion with constant de...
In this paper, a mathematical model of the control object in the form of a differential inclusion wi...
AbstractThe celebrated Filippov's theorem implies that, given a trajectory x1:[0, +∞[↦Rn of a differ...
In this paper the authors consider the problem of finding Filippov estimates when suitable state con...
The celebrated Filippov's theorem implies that, given a trajectory x(1) : [0, + infinity[ \-> R-n of...
. In this paper we consider parametric nonlinear evolution inclusions driven by time-dependent subdi...
In this paper we provide a relaxation result for control systems under both equality and inequality ...
summary:A certain converse statement of the Filippov-Wa\v zewski theorem is proved. This result exte...
AbstractWe consider the following integral-inclusion x(t) = ∫taƒ(t, s, u(s), u(t − d1), ..., u(t − d...
The paper deals with solutions of a differential inclusion x ̇ ∈ F (x) constrained to a compact con...
This paper studies a general optimal control problem for nonconvex delay-differential inclusions wit...
In the paper we study weak and strong invariance of differential inclusions with fixed time impulses...
Abstract In this paper we prove two variants of the well-known Filippov-Pliss lemma in the case of d...