In a time series context, the study of the partial autocorrelation function (PACF) is helpful for model identification. Especially in the case of autoregressive (AR) models, it is widely used for order selection. During the last decades, the use of AR-type count processes, i.e., which also fulfil the Yule–Walker equations and thus provide the same PACF characterization as AR models, increased a lot. This motivates the use of the PACF test also for such count processes. By computing the sample PACF based on the raw data or the Pearson residuals, respectively, findings are usually evaluated based on well-known asymptotic results. However, the conditions for these asymptotics are generally not fulfilled for AR-type count processes, which deter...
A flexible semi-parametric model for autocorrelated count data is proposed. Unlike earlier models av...
<p>A and B show ACF and PACF of the training set. C and D show ACF and PACF of the training set afte...
The subject of the thesis is the autocorrelation structure of time series. AR(1) process is studied ...
Abstract. We prove a representation of the partial autocorrelation function (PACF), or the Verblunsk...
This paper introduces and evaluates new models for time series count data. The Autoregressive Condit...
AbstractThe choice of a matrix square root in order to define a correlation coefficient is crucial f...
Partial autocorrelation function (PACF) of a stationary two-dimensional separable process is defined...
We prove a representation of the partial autocorrelation function (PACF), or the Verblunsky coeffici...
In this paper we propose tests for the null hypothesis that a time series process displays a constan...
This paper introduces and evaluates new models for time series count data. The Autoregressive Condit...
This paper compares two alternative models for autocorrelated count time series. The first model can...
We prove a representation of the partial autocorrelation function α(・) of a stationary process { Xn ...
Time series of count data occur frequently in practice such as in medical studies and life sciences...
The classical autocorrelation function may not be an effective and informative means in revealing th...
Abstract: Analysis of time series of counts is an important research topic in many bio-medical and s...
A flexible semi-parametric model for autocorrelated count data is proposed. Unlike earlier models av...
<p>A and B show ACF and PACF of the training set. C and D show ACF and PACF of the training set afte...
The subject of the thesis is the autocorrelation structure of time series. AR(1) process is studied ...
Abstract. We prove a representation of the partial autocorrelation function (PACF), or the Verblunsk...
This paper introduces and evaluates new models for time series count data. The Autoregressive Condit...
AbstractThe choice of a matrix square root in order to define a correlation coefficient is crucial f...
Partial autocorrelation function (PACF) of a stationary two-dimensional separable process is defined...
We prove a representation of the partial autocorrelation function (PACF), or the Verblunsky coeffici...
In this paper we propose tests for the null hypothesis that a time series process displays a constan...
This paper introduces and evaluates new models for time series count data. The Autoregressive Condit...
This paper compares two alternative models for autocorrelated count time series. The first model can...
We prove a representation of the partial autocorrelation function α(・) of a stationary process { Xn ...
Time series of count data occur frequently in practice such as in medical studies and life sciences...
The classical autocorrelation function may not be an effective and informative means in revealing th...
Abstract: Analysis of time series of counts is an important research topic in many bio-medical and s...
A flexible semi-parametric model for autocorrelated count data is proposed. Unlike earlier models av...
<p>A and B show ACF and PACF of the training set. C and D show ACF and PACF of the training set afte...
The subject of the thesis is the autocorrelation structure of time series. AR(1) process is studied ...