In this paper, we propose to address the moving average (MA) parameters estimation issue based only on noisy observations and without any knowledge on the variance of the additive stationary white Gaussian measurement noise. For this purpose, the MA process is approximated by a high-order AR process and its parameters are estimated by using an errors-in-variables (EIV) approach, which also makes it possible to derive the variances of both the driving process and the additive white noise. The method is based on the Frisch scheme. One of the main difficulties in this case is to evaluate the minimal AR-process order that must be considered to have a 'good' approximation of the MA process. To this end, we propose a way based on K-means method. ...
ARX (AutoRegressive models with eXogenous variables) are the simplest models within the equation err...
In this paper, we examine some problems that the sampling fluctuation of the estimated autocorrelati...
This paper describes an identification procedure for minimally parametrized multivariable models in ...
In this paper, we propose to address the moving average (MA) parameters estimation issue based only ...
Estimating the autoregressive parameters from noisy observations has been addressed by various autho...
This paper proposes a new method for identifying ARMA models in the presence of additive white noise...
This paper deals with the problem of identifying autoregressive models in presence of additive measu...
This paper considers the problem of estimating the parameters of an autoregressive (AR) process in p...
A new method for identifying linear dynamic errors-in-variables (EIV) models, whose input and output...
Errors-in-variables (EIV) model is a kind of model with not only noisy output but also noisy input m...
Errors-in-Variables (EIV) models consider the presence of additive errors on the measures of all mea...
A common approach in modeling signals in many engineering applications consists in adopting autoregr...
We study the problem of system identification for the errors-in-variables (EIV) model, based on nois...
This paper deals with the identification of an autoregressive (AR) process disturbed by an additive ...
ARX (AutoRegressive models with eXogenous variables) are the simplest models within the equation err...
In this paper, we examine some problems that the sampling fluctuation of the estimated autocorrelati...
This paper describes an identification procedure for minimally parametrized multivariable models in ...
In this paper, we propose to address the moving average (MA) parameters estimation issue based only ...
Estimating the autoregressive parameters from noisy observations has been addressed by various autho...
This paper proposes a new method for identifying ARMA models in the presence of additive white noise...
This paper deals with the problem of identifying autoregressive models in presence of additive measu...
This paper considers the problem of estimating the parameters of an autoregressive (AR) process in p...
A new method for identifying linear dynamic errors-in-variables (EIV) models, whose input and output...
Errors-in-variables (EIV) model is a kind of model with not only noisy output but also noisy input m...
Errors-in-Variables (EIV) models consider the presence of additive errors on the measures of all mea...
A common approach in modeling signals in many engineering applications consists in adopting autoregr...
We study the problem of system identification for the errors-in-variables (EIV) model, based on nois...
This paper deals with the identification of an autoregressive (AR) process disturbed by an additive ...
ARX (AutoRegressive models with eXogenous variables) are the simplest models within the equation err...
In this paper, we examine some problems that the sampling fluctuation of the estimated autocorrelati...
This paper describes an identification procedure for minimally parametrized multivariable models in ...