EWMA covariances and the optimal decay parameter

Investor logo
Authors

ARANEDA BARAHONA Axel Alejandro

Year of publication 2021
Type Appeared in Conference without Proceedings
Citation
Description The exponentially weighted moving average (EMWA) could be labeled as a competitive volatility estimator, where its main strongness relies on computation simplicity due to dependency only on the decay parameter, ?. Then, what is the best election for ? in the EMWA volatility model? Through a large time-series data set of historical returns of the top US large-cap companies; we test empirically the forecasting performance of the EWMA approach, under different time horizons and varying the decay parameter. Using a rolling-window scheme, the out-of-sample performance of the variance- covariance matrix is computed. The analysis of the results confirms the time-varying behavior of ?, finding different optimal values as a function of the forecasting horizon. First, using a fixed decay parameter for the full sample, the results show an agreement with the RiskMetrics suggestion for 1- month forecasting; however, for lower forecasting horizons the short-term memory gains importance. Our results shown a lower ? than the recommended one for the daily case. However, we could not discard this recommendation because the two ?-values have the same statistical forecasting accuracy. In addition, we provide the full-sample optimal decay parameter for the weekly and bi- weekly forecasting horizon. In a second approach, we also evaluate the forecasting performance of EWMA using the optimal time-varying decay parameter which minimizes the in-sample variance- covariance estimator, arriving at better accuracy than the use of a fixed-full-sample optimal parameter in case of predictions greater or equal than one week.
Related projects:

You are running an old browser version. We recommend updating your browser to its latest version.