Methods of improving the coverage of Box-Jenkins prediction intervals for linear autoregressive models are explored. These methods use bootstrap techniques to allow for parameter estimation uncertainty and to reduce the small-sample bias in the estimator of the models' parameters. In addition, we also consider a method of bias-correcting the non-linear functions of the parameter estimates that are used to generate conditional multi-step predictions. (C) 2001 International Institute of Forecasters. Published by Elsevier Science B.V. All rights reserved
The traditional Box-Jenkins approach to obtaining prediction intervals for stationary time seres ass...
Prediction intervals in State Space models can be obtained by assuming Gaussian innovations and usi...
We use a bootstrap procedure to study the impact of parameter estimation on prediction densities, fo...
Methods of improving the coverage of Box–Jenkins prediction intervals for linear autoregressive mode...
The calculation of interval forecasts for highly persistent autoregressive (AR) time series based on...
A new method is proposed to obtain interval forecasts for autoregressive models taking into account ...
This paper examines the performance of prediction intervals based on bootstrap for threshold autoreg...
In order to construct prediction intervals without the combersome--and typically unjustifiable--assu...
We construct bootstrap prediction intervals for linear autoregressions, nonlinear autoregressions, n...
The familiar Box and Jenkins method used to build prediction intervals for AR processes neglects the...
This paper examines the performance of prediction intervals based on bootstrap for threshold autoreg...
Prediction intervals in State Space models can be obtained by assuming Gaussian innovations and usin...
Prediction intervals in state space models can be obtained by assuming Gaussian innovations and usin...
Two new methods for improving prediction regions in the context of vector autoregressive (VAR) model...
Traditional Box-Jenkins prediction intervals perform poorly when the innovations are not Gaussian. N...
The traditional Box-Jenkins approach to obtaining prediction intervals for stationary time seres ass...
Prediction intervals in State Space models can be obtained by assuming Gaussian innovations and usi...
We use a bootstrap procedure to study the impact of parameter estimation on prediction densities, fo...
Methods of improving the coverage of Box–Jenkins prediction intervals for linear autoregressive mode...
The calculation of interval forecasts for highly persistent autoregressive (AR) time series based on...
A new method is proposed to obtain interval forecasts for autoregressive models taking into account ...
This paper examines the performance of prediction intervals based on bootstrap for threshold autoreg...
In order to construct prediction intervals without the combersome--and typically unjustifiable--assu...
We construct bootstrap prediction intervals for linear autoregressions, nonlinear autoregressions, n...
The familiar Box and Jenkins method used to build prediction intervals for AR processes neglects the...
This paper examines the performance of prediction intervals based on bootstrap for threshold autoreg...
Prediction intervals in State Space models can be obtained by assuming Gaussian innovations and usin...
Prediction intervals in state space models can be obtained by assuming Gaussian innovations and usin...
Two new methods for improving prediction regions in the context of vector autoregressive (VAR) model...
Traditional Box-Jenkins prediction intervals perform poorly when the innovations are not Gaussian. N...
The traditional Box-Jenkins approach to obtaining prediction intervals for stationary time seres ass...
Prediction intervals in State Space models can be obtained by assuming Gaussian innovations and usi...
We use a bootstrap procedure to study the impact of parameter estimation on prediction densities, fo...