International audienceIn this technical note, we give a geometrical framework for the design of observers on finite-dimensional Lie groups for systems which possess some specific symmetries. The design and the error (between true and estimated state) equation are explicit and intrinsic. We consider also a particular case: left-invariant systems on Lie groups with right equivariant output. The theory yields a class of observers such that the error equation is autonomous. The observers converge locally around any trajectory, and the global behavior is independent from the trajectory, which is reminiscent of the linear stationary case
The kinematics of many mechanical systems encountered in robotics and other fields, such as single-b...
This paper deals with the problem of output regulation for left invariant systems defined on general...
This paper presents the equivariant systems theory and observer design for second order kinematic s...
International audienceThis paper presents the theory of invariant observers, i.e, symmetry-preservin...
International audienceWe consider a left-invariant dynamics on an arbitrary Lie group. We show that ...
A major motivation for Lie group observers is their application as sensor fusion algorithms for an i...
International audienceFor linear time-invariant systems, a separation principle holds: stable observ...
In this paper we introduce a general design approach for observers for left-invariant systems on a L...
The kinematics and dynamics of many robotic systems evolve on differential manifolds, rather than st...
This paper considers the design of nonlinear state observers for finite-dimensional equivariant kine...
International audienceA first theory of invariant observers is developed. An invariant observer is a...
This thesis considers the state estimation problem for invariant systems on Lie groups with inp...
International audienceWe analyze the convergence aspects of the invariant extended Kalman filter (IE...
Abstract—This paper proposes a nonlinear pose observer designed directly on the Lie group structure ...
The problem of output regulation deals with asymptotic tracking/rejection of a prescribed reference ...
The kinematics of many mechanical systems encountered in robotics and other fields, such as single-b...
This paper deals with the problem of output regulation for left invariant systems defined on general...
This paper presents the equivariant systems theory and observer design for second order kinematic s...
International audienceThis paper presents the theory of invariant observers, i.e, symmetry-preservin...
International audienceWe consider a left-invariant dynamics on an arbitrary Lie group. We show that ...
A major motivation for Lie group observers is their application as sensor fusion algorithms for an i...
International audienceFor linear time-invariant systems, a separation principle holds: stable observ...
In this paper we introduce a general design approach for observers for left-invariant systems on a L...
The kinematics and dynamics of many robotic systems evolve on differential manifolds, rather than st...
This paper considers the design of nonlinear state observers for finite-dimensional equivariant kine...
International audienceA first theory of invariant observers is developed. An invariant observer is a...
This thesis considers the state estimation problem for invariant systems on Lie groups with inp...
International audienceWe analyze the convergence aspects of the invariant extended Kalman filter (IE...
Abstract—This paper proposes a nonlinear pose observer designed directly on the Lie group structure ...
The problem of output regulation deals with asymptotic tracking/rejection of a prescribed reference ...
The kinematics of many mechanical systems encountered in robotics and other fields, such as single-b...
This paper deals with the problem of output regulation for left invariant systems defined on general...
This paper presents the equivariant systems theory and observer design for second order kinematic s...