estimating, simulating, and forecasting with garch models
garch models are conditionally heteroskedastic models with a constant unconditional variance. they have been widely used in financial and econometric modeling and analysis since the 1980s. these models are characterized by their ability to capture volatility clustering, and they are widely used to account for nonuniform variance in time-series data.
effective approaches to modeling and analyzing univariate garch processes include:
- estimating parameters of a univariate garch(p, q) model with gaussian innovations
- simulating univariate garch(p, q) processes
- forecasting conditional variances
additional time-series capabilities to consider for modeling stochastic processes include:
- univariate armax/garch composite models
- multivariate varmax models
- cointegration analysis
for more information, see econometrics toolbox™.
examples and how to
software reference
see also: cointegration, time-series analysis, time series regression, predictive modeling