Prediction intervals in State Space models can be obtained by assuming Gaussian innovations and using the prediction equations of the Kalman filter, where the true parameters are substituted by consistent estimates. This approach has two limitations. First, it does not incorporate the uncertainty due to parameter estimation. Second, the Gaussianity assumption of future innovations may be inaccurate. To overcome these drawbacks, Wall and Stoffer (2002) propose to obtain prediction intervals by using a bootstrap procedure that requires the backward representation of the model. Obtaining this representation increases the complexity of the procedure and limits its implementation to models for which it exists. The bootstrap procedure pro...
We propose simple parametric and nonparametric bootstrap methods for estimating the prediction mean ...
Traditional Box-Jenkins prediction intervals perform poorly when the innovations are not Gaussian. N...
Abstract. To evaluate predictability of complex behavior produced from nonlinear dynamical systems, ...
Prediction intervals in State Space models can be obtained by assuming Gaussian innovations and usi...
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 usi...
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...
In order to construct prediction intervals without the combersome--and typically unjustifiable--assu...
We propose a simple but general bootstrap method for estimating the Prediction Mean Square Error (PM...
We construct bootstrap prediction intervals for linear autoregressions, nonlinear autoregressions, n...
Methods of improving the coverage of Box–Jenkins prediction intervals for linear autoregressive mode...
We propose bootstrap prediction intervals for an observation h periods into the future and its condi...
We propose simple parametric and nonparametric bootstrap methods for estimating the prediction mean ...
Traditional Box-Jenkins prediction intervals perform poorly when the innovations are not Gaussian. N...
Abstract. To evaluate predictability of complex behavior produced from nonlinear dynamical systems, ...
Prediction intervals in State Space models can be obtained by assuming Gaussian innovations and usi...
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 usi...
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...
In order to construct prediction intervals without the combersome--and typically unjustifiable--assu...
We propose a simple but general bootstrap method for estimating the Prediction Mean Square Error (PM...
We construct bootstrap prediction intervals for linear autoregressions, nonlinear autoregressions, n...
Methods of improving the coverage of Box–Jenkins prediction intervals for linear autoregressive mode...
We propose bootstrap prediction intervals for an observation h periods into the future and its condi...
We propose simple parametric and nonparametric bootstrap methods for estimating the prediction mean ...
Traditional Box-Jenkins prediction intervals perform poorly when the innovations are not Gaussian. N...
Abstract. To evaluate predictability of complex behavior produced from nonlinear dynamical systems, ...