In this paper, we propose a new approach to identify a new class of nonlinear autoregressive models with exogenous inputs (NARX) based on kernel machine and space projection (KMSP). The well-known Hammerstein-Wiener model which includes blocks of nonlinear static functions in series with a linear dynamic block is a subset of the NARX models considered. In the KMSP based approach, kernel machine is used to represent the functions and space projection to separate the represented functions. We also discuss two possible ambiguities and give conditions to avoid such ambiguities. The asymptotic behavior of the proposed approach is analyzed. The performance of the proposed method is verified by simulation studies
International audienceIn this letter, we first present explicit relations between block-oriented non...
Nonlinear system identification based on support vector machines (SVM) has been usually addressed by...
We present a novel nonparametric approach for identification of nonlinear systems. Exploiting the fr...
This paper is concerned with nonparametric identification of nonlinear autoregressive systems with e...
A unified approach to reccurent kernel identification algorithms design is proposed. In order to fix...
International audienceAutoregressive (AR) modeling is a very popular method for time series analysis...
In literature, various linear and nonlinear model structures are defined to identify the systems. Li...
Given a time series arising as the observations of some dynamical system, it is possible to reconstr...
Hammerstein systems are the series composition of a static nonlinear function and a linear dynamic s...
Most systems encountered in the real world are nonlinear in nature, and since linear models cannot c...
The nonparametric identification for nonlinear autoregressive systems with exogenous inputs (NARX) d...
Download Citation Email Print Request Permissions The object of this paper is the identification of...
Most systems encountered in the real world are nonlinear in nature, and since linear models cannot c...
This work presents a novel regularization method for the identification of Nonlinear Autoregressive ...
We consider the question of predicting nonlinear time series. Kernel Dynamical Modeling, a new meth...
International audienceIn this letter, we first present explicit relations between block-oriented non...
Nonlinear system identification based on support vector machines (SVM) has been usually addressed by...
We present a novel nonparametric approach for identification of nonlinear systems. Exploiting the fr...
This paper is concerned with nonparametric identification of nonlinear autoregressive systems with e...
A unified approach to reccurent kernel identification algorithms design is proposed. In order to fix...
International audienceAutoregressive (AR) modeling is a very popular method for time series analysis...
In literature, various linear and nonlinear model structures are defined to identify the systems. Li...
Given a time series arising as the observations of some dynamical system, it is possible to reconstr...
Hammerstein systems are the series composition of a static nonlinear function and a linear dynamic s...
Most systems encountered in the real world are nonlinear in nature, and since linear models cannot c...
The nonparametric identification for nonlinear autoregressive systems with exogenous inputs (NARX) d...
Download Citation Email Print Request Permissions The object of this paper is the identification of...
Most systems encountered in the real world are nonlinear in nature, and since linear models cannot c...
This work presents a novel regularization method for the identification of Nonlinear Autoregressive ...
We consider the question of predicting nonlinear time series. Kernel Dynamical Modeling, a new meth...
International audienceIn this letter, we first present explicit relations between block-oriented non...
Nonlinear system identification based on support vector machines (SVM) has been usually addressed by...
We present a novel nonparametric approach for identification of nonlinear systems. Exploiting the fr...