[[abstract]]The first-order moving average model or MA(1) is given by $X_t=Z_t-\theta_0Z_{t-1}$, with independent and identically distributed $\{Z_t\}$. This is arguably the simplest time series model that one can write down. The MA(1) with unit root ($\theta_0=1$) arises naturally in a variety of time series applications. For example, if an underlying time series consists of a linear trend plus white noise errors, then the differenced series is an MA(1) with unit root. In such cases, testing for a unit root of the differenced series is equivalent to testing the adequacy of the trend plus noise model. The unit root problem also arises naturally in a signal plus noise model in which the signal is modeled as a random walk. The differenced ser...
AbstractAn autoregressive-moving average model in which all roots of the autoregressive polynomial a...
We consider time series models of the MA (moving average) family, and deal with the estimation of th...
Slepian models are derived for a stochastic process observed at level crossings of a moving average ...
A limit theory was developed in the papers of Davis and Dunsmuir (1996) and Davis et al. (1995) for ...
Dealing with noninvertible, infinite-order moving average (MA) models, we study the asymptotic prope...
A limit theory was developed in the papers of Davis and Dunsmuir (1996) and Davis et al. (1995) for ...
This paper derives the exact distribution of the maximum likelihood estimator of a first-order linea...
In this paper, we examine some problems that the sampling fluctuation of the estimated autocorrelati...
Least squares (LS) and maximum likelihood (ML) estimation are considered for unit root processes wit...
Abstract: In this work, Bayes estimation of the first order moving average model (MA(1)) were studie...
The method of Laplace is used to approximate posterior probabilities for a collection of polynomial ...
The likelihoood function of the Gaussian MA(1) zero-mean can be expressed in terms of the variance o...
A new class of time series models known as Generalized Autoregressive of order one with first-order ...
Moving average (MA) is a time series model often used for pattern forecasting and recognition. It co...
AbstractA limit theory was developed in the papers of Davis and Dunsmuir (1996) and Davis et al. (19...
AbstractAn autoregressive-moving average model in which all roots of the autoregressive polynomial a...
We consider time series models of the MA (moving average) family, and deal with the estimation of th...
Slepian models are derived for a stochastic process observed at level crossings of a moving average ...
A limit theory was developed in the papers of Davis and Dunsmuir (1996) and Davis et al. (1995) for ...
Dealing with noninvertible, infinite-order moving average (MA) models, we study the asymptotic prope...
A limit theory was developed in the papers of Davis and Dunsmuir (1996) and Davis et al. (1995) for ...
This paper derives the exact distribution of the maximum likelihood estimator of a first-order linea...
In this paper, we examine some problems that the sampling fluctuation of the estimated autocorrelati...
Least squares (LS) and maximum likelihood (ML) estimation are considered for unit root processes wit...
Abstract: In this work, Bayes estimation of the first order moving average model (MA(1)) were studie...
The method of Laplace is used to approximate posterior probabilities for a collection of polynomial ...
The likelihoood function of the Gaussian MA(1) zero-mean can be expressed in terms of the variance o...
A new class of time series models known as Generalized Autoregressive of order one with first-order ...
Moving average (MA) is a time series model often used for pattern forecasting and recognition. It co...
AbstractA limit theory was developed in the papers of Davis and Dunsmuir (1996) and Davis et al. (19...
AbstractAn autoregressive-moving average model in which all roots of the autoregressive polynomial a...
We consider time series models of the MA (moving average) family, and deal with the estimation of th...
Slepian models are derived for a stochastic process observed at level crossings of a moving average ...