Assessing Uncertainty | Abstract of "Prediction intervals for time series," Chris Chatfield, Department of Mathematical Sciences, University of Bath |
Computing prediction intervals (P.I.s) is an important part of the forecasting process intended to indicate the likely uncertainty in point forecasts. The commonest method of calculating P.I.s is to use theoretical formulae conditional on a best-fitting model. If a normality assumption is used, it needs to be checked. Alternative computational procedures that are not so dependent on a fitted model include the use of empirically based and
resampling methods. Some so-called approximate formulae should be avoided. P.I.s tend to be too narrow because out-of-sample forecast accuracy is often poorer than would be expected from within-sample fit, particularly for P.I.s calculated conditional on a model fitted to past data. Reasons for this include uncertainty about the model and a changing environment. Ways of overcoming these problems include using a mixture of models with a
Bayesian approach and
using a forecasting method that is designed to be robust to changes in the underlying
model.
Keywords: Bayesian forecasting; Bootstrapping; Box-Jenkins method; Holt-Winters method;
Prediction intervals; Resampling