1. A New Approach to Volatility Modeling: The Factorial Hidden Markov Volatility Model
- Author
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Arnaud Dufays, Maciej Augustyniak, Luc Bauwens, and UCL - SSH/LIDAM/CORE - Center for operations research and econometrics
- Subjects
Statistics and Probability ,Economics and Econometrics ,Factorial ,Volatility model ,leverage effect ,05 social sciences ,Leverage effect ,volatility ,Hierarchical hidden Markov model ,persistence ,01 natural sciences ,010104 statistics & probability ,hierarchical hidden Markov model ,Markov-switching ,0502 economics and business ,Econometrics ,0101 mathematics ,Statistics, Probability and Uncertainty ,Volatility (finance) ,Hidden Markov model ,Social Sciences (miscellaneous) ,050205 econometrics ,Mathematics - Abstract
A new process—the factorial hidden Markov volatility (FHMV) model—is proposed to model financial returns or realized variances. Its dynamics are driven by a latent volatility process specified as a product of three components: a Markov chain controlling volatility persistence, an independent discrete process capable of generating jumps in the volatility, and a predictable (data-driven) process capturing the leverage effect. An economic interpretation is attached to each one of these components. Moreover, the Markov chain and jump components allow volatility to switch abruptly between thousands of states, and the transition matrix of the model is structured to generate a high degree of volatility persistence. An empirical study on six financial time series shows that the FHMV process compares favorably to state-of-the-art volatility models in terms of in-sample fit and out-of-sample forecasting performance over time horizons ranging from 1 to 100 days. Supplementary materials for this article are available online.
- Published
- 2018
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