AbstractWe develop a technique for derivation of the asymptotic joint distribution of the sample partial autocorrelations of a process, given the corresponding distribution of sample autocorrelations. No assumption of asymptotic normality is needed. The underlying process need not be stationary. The technique is demonstrated through a detailed study of ARMA (1,1)-like processes, but is applicable to other models. The results extend those of Mills and Seneta (1989) for the AR(1)-like case. The study is motivated by the known relationships and properties, especially is the classical AR(p) case, of population and sample partial autocorrelations
In the autoregressive moving average (ARMA) model with one autoregressive unit root, limiting distri...
We propose an asymptotically distribution-free transform of the sample autocorrelations of residuals...
We study the sample autocovariance and autocorrelation function of the stationary AR(1) process with...
AbstractWe develop a technique for derivation of the asymptotic joint distribution of the sample par...
Partial autocorrelation function (PACF) of a stationary two-dimensional separable process is defined...
One of the difficulties that arise in the statistical analysis of autoregressive schemes is the very...
Abstract: The paper presents a systematic theory for asymptotic inference of autocovariances of stat...
It is shown that for a data set from a branching process with immigration, where the offspring distr...
AbstractOne computationally efficient procedure for obtaining maximum likelihood parameter estimates...
We show that if a process can be obtained by filtering an autoregressive process, then the asymptoti...
AbstractWe show that if a process can be obtained by filtering an autoregressive process, then the a...
Abstract. We prove a simple asymptotic formula for partial autocorrelation func-tions of fractional ...
Abstract. We prove a simple asymptotic formula for partial autocorrelation func-tions of fractional ...
AbstractThe choice of a matrix square root in order to define a correlation coefficient is crucial f...
AbstractOne of the difficulties that arise in the statistical analysis of autoregressive schemes is ...
In the autoregressive moving average (ARMA) model with one autoregressive unit root, limiting distri...
We propose an asymptotically distribution-free transform of the sample autocorrelations of residuals...
We study the sample autocovariance and autocorrelation function of the stationary AR(1) process with...
AbstractWe develop a technique for derivation of the asymptotic joint distribution of the sample par...
Partial autocorrelation function (PACF) of a stationary two-dimensional separable process is defined...
One of the difficulties that arise in the statistical analysis of autoregressive schemes is the very...
Abstract: The paper presents a systematic theory for asymptotic inference of autocovariances of stat...
It is shown that for a data set from a branching process with immigration, where the offspring distr...
AbstractOne computationally efficient procedure for obtaining maximum likelihood parameter estimates...
We show that if a process can be obtained by filtering an autoregressive process, then the asymptoti...
AbstractWe show that if a process can be obtained by filtering an autoregressive process, then the a...
Abstract. We prove a simple asymptotic formula for partial autocorrelation func-tions of fractional ...
Abstract. We prove a simple asymptotic formula for partial autocorrelation func-tions of fractional ...
AbstractThe choice of a matrix square root in order to define a correlation coefficient is crucial f...
AbstractOne of the difficulties that arise in the statistical analysis of autoregressive schemes is ...
In the autoregressive moving average (ARMA) model with one autoregressive unit root, limiting distri...
We propose an asymptotically distribution-free transform of the sample autocorrelations of residuals...
We study the sample autocovariance and autocorrelation function of the stationary AR(1) process with...