This paper addresses the problem of identifiability of nonlinear polynomial state-space systems. Such systems have already been studied via the input-output equations, a description that, in general, requires differential algebra. The authors use a different algebraic approach, which is based on distinguishability and observability. Employing techniques from algebraic geometry such as polynomial ideals and Gröbner bases, local as well as global results are derived. The methods are illustrated on some example systems
Under certain controllability and observability restrictions, two different parameterisations for a ...
We analyze Glad/Fliess algebraic observability for polynomial control systems from a commutative alg...
International audienceIn this paper, we study a polynomial decomposition model that arises in proble...
Abstract—This paper establishes identifiability and in-formativity conditions for a class of determi...
New results are presented concerning the state isomorphism approach to global identifiability analys...
It is shown that identifiability of very general nonlinear models, described by polynomial implicit ...
International audienceDifferent notions of identifiability are available for discrete-time nonlinear...
This paper considers two different methods in the analysis of nonlinear controlled dynamical system ...
Identifiability is important to guarantee convergence in system identification applications, and obs...
A common problem when analyzing models, such as mathematical modeling of a biological process, is to...
International audienceThis paper presents a method for investigating, through an automatic procedure...
Identifiability is a property of a parametrization of a system. A parametrization is a map from a pa...
When estimating unknown parameters, it is important that the model is identifiable so that the param...
The parameter identifiability problem of deterministic non-linear control systems is studied. Relati...
Structural identifiability analysis of nonlinear dynamic models requires symbolic manipulations, who...
Under certain controllability and observability restrictions, two different parameterisations for a ...
We analyze Glad/Fliess algebraic observability for polynomial control systems from a commutative alg...
International audienceIn this paper, we study a polynomial decomposition model that arises in proble...
Abstract—This paper establishes identifiability and in-formativity conditions for a class of determi...
New results are presented concerning the state isomorphism approach to global identifiability analys...
It is shown that identifiability of very general nonlinear models, described by polynomial implicit ...
International audienceDifferent notions of identifiability are available for discrete-time nonlinear...
This paper considers two different methods in the analysis of nonlinear controlled dynamical system ...
Identifiability is important to guarantee convergence in system identification applications, and obs...
A common problem when analyzing models, such as mathematical modeling of a biological process, is to...
International audienceThis paper presents a method for investigating, through an automatic procedure...
Identifiability is a property of a parametrization of a system. A parametrization is a map from a pa...
When estimating unknown parameters, it is important that the model is identifiable so that the param...
The parameter identifiability problem of deterministic non-linear control systems is studied. Relati...
Structural identifiability analysis of nonlinear dynamic models requires symbolic manipulations, who...
Under certain controllability and observability restrictions, two different parameterisations for a ...
We analyze Glad/Fliess algebraic observability for polynomial control systems from a commutative alg...
International audienceIn this paper, we study a polynomial decomposition model that arises in proble...