Francq, Christian and Sucarrat, Genaro (2013): An Exponential Chi-Squared QMLE for Log-GARCH Models Via the ARMA Representation.
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Abstract
Estimation of log-GARCH models via the ARMA representation is attractive because it enables a vast amount of already established results in the ARMA literature. We propose an exponential Chi-squared QMLE for log-GARCH models via the ARMA representation. The advantage of the estimator is that it corresponds to the theoretically and empirically important case where the conditional error of the log-GARCH model is normal. We prove the consistency and asymptotic normality of the estimator, and show that, asymptotically, it is as efficient as the standard QMLE in the log-GARCH(1,1) case. We also verify and study our results in finite samples by Monte Carlo simulations. An empirical application illustrates the versatility and usefulness of the estimator.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | An Exponential Chi-Squared QMLE for Log-GARCH Models Via the ARMA Representation |
| English Title: | An Exponential Chi-Squared QMLE for Log-GARCH Models Via the ARMA Representation |
| Language: | English |
| Keywords: | Log-GARCH, EGARCH, Quasi Maximum Likelihood, Exponential Chi- Squared, ARMA |
| Subjects: | C - Mathematical and Quantitative Methods > C1 - Econometric and Statistical Methods and Methodology: General > C13 - Estimation: General C - Mathematical and Quantitative Methods > C2 - Single Equation Models ; Single Variables > C22 - Time-Series Models ; Dynamic Quantile Regressions ; Dynamic Treatment Effect Models ; Diffusion Processes C - Mathematical and Quantitative Methods > C5 - Econometric Modeling > C58 - Financial Econometrics |
| Item ID: | 51783 |
| Depositing User: | Dr. Genaro Sucarrat |
| Date Deposited: | 29 Nov 2013 05:15 |
| Last Modified: | 26 Sep 2019 19:29 |
| References: | Berkes, I., L. Horvath, and P. Kokoszka (2003). GARCH processes: structure and estimation. Bernoulli 9, 201–227. Billingsley, P. (1995). Probability and Measure. Bollerslev, T. (1986). Generalized autoregressive conditional heteroscedasticity. Journal of Econometrics 31, 307–327. Brockwell, P. J. and R. A. Davis (2006). Time Series: Theory and Methods. New York: Springer. 2nd. Edition. Brownlees, C., F. Cipollini, and G. Gallo (2012). Multiplicative Error Models. In L. Bauwens, C. Hafner, and S. Laurent (Eds.), Handbook of Volatility Models and Their Applications. New Jersey: Wiley. Creal, D., S. J. Koopmans, and A. Lucas (2013). Generalized Autoregressive Score Models with Applications. Journal of Applied Econometrics 28, 777–795. Engle, R. (1982). Autoregressive Conditional Heteroscedasticity with Estimates of the Variance of United Kingdom Inflations. Econometrica 50, 987–1008. Engle, R. F. and T. Bollerslev (1986). Reply. Econometric Reviews 5, 81–87. Fernández, C. and M. Steel (1998). On Bayesian Modelling of Fat Tails and Skewness. Journal of the American Statistical Association 93, 359–371. Francq, C., L. Horvath, and J.-M. Zakoian (2011). Merits and drawbacks of variance targeting in GARCH models. Journal of Financial Econometrics 9, 619–656. Francq, C., O. Wintenberger, and J.-M. Zakoïan (2013). GARCH Models Without Positivity Constraints: Exponential or Log-GARCH? Forthcoming in Journal of Econometrics, http//dx.doi.org/10.1016/j.jeconom.2013.05.004. Francq, C. and J.-M. Zakoïan (2004). Maximum likelihood estimation of pure GARCH and ARMA-GARCH processes. Bernoulli 10, 605–637. Francq, C. and J.-M. Zakoïan (2010). GARCH Models. New York: Marcel Dekker. Franses, P. H., J. Neele, and D. Van Dijk (2001). Modelling asymmetric volatility in weekly Dutch temperature data. Environmental Modeling and Software 16, 131–137. Geweke, J. (1986). Modelling the Persistence of Conditional Variance: A Comment. Econometric Reviews 5, 57–61. Gourieroux, C., A. Monfort, and A. Trognon (1984). Pseudo Maximum Likelihood Methods: Theory. Econometrics 52, 681–700. Harvey, A. C. (2013). Dynamic Models for Volatility and Heavy Tails. New York: Cambridge University Press. Koopman, S. J., M. Ooms, and M. A. Carnero (2007). Periodic Seasonal REG-ARFIMAGARCH Models for Daily Electricity Spot Prices. Journal of the American Statistical Association 102, 16–27. Ljung, G. and G. Box (1979). On a Measure of Lack of Fit in Time Series Models. Biometrika 66, 265–270. McLeod, A. (1978). On the Distribution of Residual Autocorrelations in Box-Jenkins Method. Journal of the Royal Statistical Society B 40, 296–302. Milhøj, A. (1987). A Multiplicative Parametrization of ARCH Models. Research Report 101, University of Copenhagen: Institute of Statistics. Nelson, D. B. (1991). Conditional Heteroskedasticity in Asset Returns: A New Approach. Econometrica 59, 347–370. Pantula, S. (1986). Modelling the Persistence of Conditional Variance: A Comment. Econometric Reviews 5, 71–73. Straumann, D. and T. Mikosch (2006). Quasi-Maximum-Likelihood Estimation in Conditionally Heteroscedastic Time Series: A Stochastic Recurrence Equations Approach. The Annals of Statistics 34, 2449–2495. Sucarrat, G. (2011). AutoSEARCH: An R Package for Automated Financial Modelling. Sucarrat, G. and Á. Escribano (2012). Automated Model Selection in Finance: Generalto-Specific Modelling of the Mean and Volatility Specifications. Oxford Bulletin of Economics and Statistics 74, 716–735. Sucarrat, G. and Á. Escribano (2013). Unbiased QML Estimation of Log-GARCH Models in the Presence of Zero Errors. MPRA Paper No. 50699. Online at http://mpra.ub. uni-muenchen.de/50699/. Sucarrat, G., S. Grønneberg, and Á. Escribano (2013). Estimation and Inference in Univariate and Multivariate Log-GARCH-X Models When the Conditional Density is Unknown. MPRA Paper No. 49344. Online at http://mpra.ub.uni-muenchen.de/49344/. Wald, A. (1949). Note on the consistency of the maximum likelihood estimate. Annals of Mathematical Statistics 20, 595–601. White, H. (1980). A Heteroskedasticity-Consistent Covariance Matrix and a Direct Test for Heteroskedasticity. Econometrica 48, 817–838. Wintenberger, O. (2012). QML estimation of the continuously invertible EGARCH(1,1) model. Unpublished working paper. |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/51783 |
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