Stationary vine copula models for multivariate time series
Dokumenttyp:
Zeitschriftenaufsatz
Autor(en):
Nagler, T.; Krüger, D.; Min, A.
Nicht-TUM Koautoren:
ja
Kooperation:
international
Abstract:
Multivariate time series exhibit two types of dependence: across variables and across
time points. Vine copulas are graphical models for the dependence and can conveniently
capture both types of dependence in the same model. We derive the maximal class of
graph structures that guarantee stationarity under a natural and verifiable condition
called translation invariance. We propose computationally efficient methods for estimation,
simulation, prediction, and uncertainty quantification and show their validity by
asymptotic results and simulations. The theoretical results allow for misspecified models
and, even when specialized to the iid case, go beyond what is available in the literature.
The new model class is illustrated by an application to forecasting returns of a portfolio
of 20 stocks, where they show excellent forecas
«
Multivariate time series exhibit two types of dependence: across variables and across
time points. Vine copulas are graphical models for the dependence and can conveniently
capture both types of dependence in the same model. We derive the maximal class of
graph structures that guarantee stationarity under a natural and verifiable condition
called translation invariance. We propose computationally efficient methods for estimation,
simulation, prediction, and uncertainty quantification and sh...
»