Year
2023
Authors
CHEVILLON Guillaume, BAUWENS Luc, LAURENT Sebastien
Abstract
Two recent contributions have found conditions for large dimensional networks or systems to generate long memory in their individual components. We build on these and provide a multivariate methodology for modeling and forecasting series displaying long range dependence. We model long memory properties within a vector autoregressive system of order 1 and consider Bayesian estimation or ridge regression. For these, we derive a theory-driven parametric setting that informs a prior distribution or a shrinkage target. Our proposal significantly outperforms univariate time series long-memory models when forecasting a daily volatility measure for 250 U.S. company stocks over twelve years. This provides an empirical validation of the theoretical results showing long memory can be sourced to marginalization within a large dimensional system.
BAUWENS, L., CHEVILLON, G. et LAURENT, S. (2023). We modeled long memory with just one lag! Journal of Econometrics, 236(1), pp. 105467.