This article considers fractionally integrated autoregressive moving-average time series models with conditional heteroscedasticity, which combines the popular generalized autoregressive conditional heteroscedastic (GARCH) and the fractional (ARMA) models. The fractional differencing parameter d can be greater than 1/2, thus incorporating the important unit root case. Some sufficient conditions for stationarity, ergodicity, and existence of higher-order moments are derived. An algorithm for approximate maximum likelihood (ML) estimation is presented. The asymptotic properties of ML estimators, which include consistency and asymptotic normality, are discussed. The large-sample distributions of the residual autocorrelations and the square-res...
This paper discusses model-based inference in an autoregressive model for fractional processes which...
In his seminal 1982 paper, Robert F. Engle described a time series model with a time-varying volatil...
This article examines the power of two well-known procedures of fractional integration in the contex...
This article considers fractionally integrated autoregressive moving-average time series models with...
We consider a unified least absolute deviation estimator for stationary and nonstationary fractional...
This paper considers nonstationary fractional autoregressive integrated moving-average ( p, d, q) mo...
The prime goal of this research is to model the long-range dependency and volatility factors fitting...
ii Autoregressive and Moving Average time series models and their combination are reviewed. Autoregr...
Least absolute deviation estimation for fractionally integrated autoregressive moving average time s...
Here we present a theoretical study on the main properties of Fractionally Integrated Exponential Ge...
The estimation and diagnostic checking of the fractional autoregressive integrated moving average wi...
vii, 94 leaves : ill. (some col.); 30 cm.PolyU Library Call No.: [THS] LG51 .H577M AMA 1999 LauThe e...
Aspects of model building using fractionally differenced autoregressive-moving average processes are...
January 2004; revised August 2006This paper is based on a portion of Chapters 1 and 2 of the author'...
We discuss computational aspects of likelihood-based specification, estimation,inference, and foreca...
This paper discusses model-based inference in an autoregressive model for fractional processes which...
In his seminal 1982 paper, Robert F. Engle described a time series model with a time-varying volatil...
This article examines the power of two well-known procedures of fractional integration in the contex...
This article considers fractionally integrated autoregressive moving-average time series models with...
We consider a unified least absolute deviation estimator for stationary and nonstationary fractional...
This paper considers nonstationary fractional autoregressive integrated moving-average ( p, d, q) mo...
The prime goal of this research is to model the long-range dependency and volatility factors fitting...
ii Autoregressive and Moving Average time series models and their combination are reviewed. Autoregr...
Least absolute deviation estimation for fractionally integrated autoregressive moving average time s...
Here we present a theoretical study on the main properties of Fractionally Integrated Exponential Ge...
The estimation and diagnostic checking of the fractional autoregressive integrated moving average wi...
vii, 94 leaves : ill. (some col.); 30 cm.PolyU Library Call No.: [THS] LG51 .H577M AMA 1999 LauThe e...
Aspects of model building using fractionally differenced autoregressive-moving average processes are...
January 2004; revised August 2006This paper is based on a portion of Chapters 1 and 2 of the author'...
We discuss computational aspects of likelihood-based specification, estimation,inference, and foreca...
This paper discusses model-based inference in an autoregressive model for fractional processes which...
In his seminal 1982 paper, Robert F. Engle described a time series model with a time-varying volatil...
This article examines the power of two well-known procedures of fractional integration in the contex...