International audienceFor linear time-invariant systems, a separation principle holds: stable observer and stable state feedback can be designed for the time-invariant system, and the combined observer and feedback will be stable. For non-linear systems, a local separation principle holds around steady-states, as the linearized system is time-invariant. This paper addresses the issue of a non-linear separation principle on Lie groups. For invariant systems on Lie groups, we prove there exists a large set of (time-varying) trajectories around which the linearized observer-controler system is time-invariant, as soon as a symmetry-preserving observer is used. Thus a separation principle holds around those trajectories. The theory is illustrate...
AbstractA subset X of a vector space V is said to have the “Separation Property” if it separates lin...
We consider under-actuated, drift-free, invariant systems on matrix Lie groups and show how motion c...
This paper considers the problem of tracking reference trajectories for systems defined on matrix Li...
International audienceIn this technical note, we give a geometrical framework for the design of obse...
A wide range of dynamical systems from fields as diverse as mechanics, electrical networks and molec...
We study the reduction by symmetry for optimality conditions in optimal control problems of left-inv...
This paper presents initial results on the control of mechanical systems for which group symmetries ...
In the classical theory of finite-dimensional linear time-invariant systems in state space form the ...
In this paper we treat the problem of practical feedback stabilization for a class of nonlinear time...
This thesis investigates the set stabilization problem for systems with Lie group symmetry. Initiall...
This paper deals with the problem of output regulation for left invariant systems defined on general...
In this dissertation, we study motion control problems in the framework of systems on finite-dimenti...
International audienceWe propose a unifying and versatile framework for a class of discrete time s...
In this thesis, we consider smooth optimal control systems that evolve on Lie groups. Pontryagin's m...
In this dissertation we study the control of nonholonomic systems defined by invariant vector fields...
AbstractA subset X of a vector space V is said to have the “Separation Property” if it separates lin...
We consider under-actuated, drift-free, invariant systems on matrix Lie groups and show how motion c...
This paper considers the problem of tracking reference trajectories for systems defined on matrix Li...
International audienceIn this technical note, we give a geometrical framework for the design of obse...
A wide range of dynamical systems from fields as diverse as mechanics, electrical networks and molec...
We study the reduction by symmetry for optimality conditions in optimal control problems of left-inv...
This paper presents initial results on the control of mechanical systems for which group symmetries ...
In the classical theory of finite-dimensional linear time-invariant systems in state space form the ...
In this paper we treat the problem of practical feedback stabilization for a class of nonlinear time...
This thesis investigates the set stabilization problem for systems with Lie group symmetry. Initiall...
This paper deals with the problem of output regulation for left invariant systems defined on general...
In this dissertation, we study motion control problems in the framework of systems on finite-dimenti...
International audienceWe propose a unifying and versatile framework for a class of discrete time s...
In this thesis, we consider smooth optimal control systems that evolve on Lie groups. Pontryagin's m...
In this dissertation we study the control of nonholonomic systems defined by invariant vector fields...
AbstractA subset X of a vector space V is said to have the “Separation Property” if it separates lin...
We consider under-actuated, drift-free, invariant systems on matrix Lie groups and show how motion c...
This paper considers the problem of tracking reference trajectories for systems defined on matrix Li...