International audienceWe solve stabilization problems for linear time-varying systems under input delays. We show how changes of coordinates lead to systems with time invariant drifts, which are covered by the reduction model method and which lead to the problem of stabilizing a time-varying system without delay. For continuous time periodic systems, we can use Floquet theory to find the changes of coordinates. We also prove an analogue for discrete time systems, through a discrete time extension of Floquet theory
International audienceThis paper represents a first attempt toward an alternative way of computing r...
International audienceRecent work by Mazenc and Malisoff provided a trajectory-based approach to pro...
International audienceWe provide a new sequential predictors approach for the exponential stabilizat...
International audienceWe solve stabilization problems for linear time-varying systems under input de...
We study stabilization problems for time-varying linear systems with constant input delays. Our redu...
International audienceWe provide a reduction model approach for achieving global exponential stabili...
We study stabilization problems for a broad class of time varying linear systems that have constant ...
International audienceThe reduction model approach is useful for stabilizing linear systems with arb...
We provide a reduction model approach for achieving global exponential stabilization of linear syste...
In this work, a new methodology is proposed to obtain the feedback gains for the closed-loop control...
International audienceIn this work, the notion of reduction is introduced for discrete-time nonlinea...
Many practical systems have inherent time delays that cannot be ignored; thus, their dynamics are de...
This paper presents new results on delay-dependent stability and stabilization for linear systems wi...
A recent work by Mazenc and Malisoff provides a trajectory-based approach for proving stability of t...
We study the stability of a linear system with a pointwise, time-varying delay. We assume that the d...
International audienceThis paper represents a first attempt toward an alternative way of computing r...
International audienceRecent work by Mazenc and Malisoff provided a trajectory-based approach to pro...
International audienceWe provide a new sequential predictors approach for the exponential stabilizat...
International audienceWe solve stabilization problems for linear time-varying systems under input de...
We study stabilization problems for time-varying linear systems with constant input delays. Our redu...
International audienceWe provide a reduction model approach for achieving global exponential stabili...
We study stabilization problems for a broad class of time varying linear systems that have constant ...
International audienceThe reduction model approach is useful for stabilizing linear systems with arb...
We provide a reduction model approach for achieving global exponential stabilization of linear syste...
In this work, a new methodology is proposed to obtain the feedback gains for the closed-loop control...
International audienceIn this work, the notion of reduction is introduced for discrete-time nonlinea...
Many practical systems have inherent time delays that cannot be ignored; thus, their dynamics are de...
This paper presents new results on delay-dependent stability and stabilization for linear systems wi...
A recent work by Mazenc and Malisoff provides a trajectory-based approach for proving stability of t...
We study the stability of a linear system with a pointwise, time-varying delay. We assume that the d...
International audienceThis paper represents a first attempt toward an alternative way of computing r...
International audienceRecent work by Mazenc and Malisoff provided a trajectory-based approach to pro...
International audienceWe provide a new sequential predictors approach for the exponential stabilizat...