Optimal estimation problems for a class of dynamic systems described by nonlinear differential equations are considered under the effect of disturbances. The estimator is a Luenberger observer that depends on an innovation function to be suitably chosen. The optimality criterion is taken as the norm of the estimation error in a function space and is expressed by means of a cost functional dependent on the innovation function. The well-definiteness of such a functional can be guaranteed via a Lyapunov approach and in terms of input-output stability of mappings between function spaces, where the disturbances are the input and the estimation error is the output. In particular, Lp and Sobolev optimality criteria are adopted. In these cases, rel...
International audienceA family of continuous-time observable nonlinear systems with input and output...
We investigate the use of Hamilton-Jacobi approaches for the purpose of state reconstruction of dyna...
In the first part of this study, we consider the problem of designing observers, stabilizing state a...
Optimal estimation problems for a class of dynamic systems de-scribed by nonlinear differential equa...
Abstract: An approach based on optimization is described to construct state estimators that provide ...
Lyapunov functions enable analyzing the stability of dynamic systems described by ordinary different...
This paper presents a new estimation technique for linear time-invariant (LTI) systems with bounded...
International audienceThis paper deals with optimal input design for parameter estimation in a bound...
Rates of convergence are derived for approximate solutions to optimization problems associated with ...
State observers for systems having Lipschitz nonlinearities are considered for what concerns the sta...
Real world dynamic systems are frequently subjected to unknown disturbance inputs or perturbations. ...
Input-output stability results for feedback systems are developed. Robust stability conditions are p...
Input-output stability results for feedback systems are developed. Robust Stability conditions are p...
In this paper we present a review of some recent results for identification of linear dynamic system...
Optimal state estimation is a method that requires minimising a weighted, nonlinear, least-squares o...
International audienceA family of continuous-time observable nonlinear systems with input and output...
We investigate the use of Hamilton-Jacobi approaches for the purpose of state reconstruction of dyna...
In the first part of this study, we consider the problem of designing observers, stabilizing state a...
Optimal estimation problems for a class of dynamic systems de-scribed by nonlinear differential equa...
Abstract: An approach based on optimization is described to construct state estimators that provide ...
Lyapunov functions enable analyzing the stability of dynamic systems described by ordinary different...
This paper presents a new estimation technique for linear time-invariant (LTI) systems with bounded...
International audienceThis paper deals with optimal input design for parameter estimation in a bound...
Rates of convergence are derived for approximate solutions to optimization problems associated with ...
State observers for systems having Lipschitz nonlinearities are considered for what concerns the sta...
Real world dynamic systems are frequently subjected to unknown disturbance inputs or perturbations. ...
Input-output stability results for feedback systems are developed. Robust stability conditions are p...
Input-output stability results for feedback systems are developed. Robust Stability conditions are p...
In this paper we present a review of some recent results for identification of linear dynamic system...
Optimal state estimation is a method that requires minimising a weighted, nonlinear, least-squares o...
International audienceA family of continuous-time observable nonlinear systems with input and output...
We investigate the use of Hamilton-Jacobi approaches for the purpose of state reconstruction of dyna...
In the first part of this study, we consider the problem of designing observers, stabilizing state a...