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AUTOMATED INFERENCE AND LEARNING IN MODELING FINANCIAL VOLATILITY

Published online by Cambridge University Press:  08 February 2005

Michael McAleer
Michael McAleer
Affiliation:
University of Western Australia
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Abstract

This paper uses the specific-to-general methodological approach that is widely used in science, in which problems with existing theories are resolved as the need arises, to illustrate a number of important developments in the modeling of univariate and multivariate financial volatility. Some of the difficulties in analyzing time-varying univariate and multivariate conditional volatility and stochastic volatility include the number of parameters to be estimated and the computational complexities associated with multivariate conditional volatility models and both univariate and multivariate stochastic volatility models. For these reasons, among others, automated inference in its present state requires modifications and extensions for modeling in empirical financial econometrics. As a contribution to the development of automated inference in modeling volatility, 20 important issues in the specification, estimation, and testing of conditional and stochastic volatility models are discussed. A “potential for automation rating” (PAR) index and recommendations regarding the possibilities for automated inference in modeling financial volatility are given in each case.

Type
Research Article
Information
Econometric Theory , Volume 21 , Issue 1 , February 2005 , pp. 232 - 261
Copyright
© 2005 Cambridge University Press

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References

REFERENCES

Andersen, T.G., T. Bollerslev, & F.X. Diebold (2002) Parametric and nonparametric volatility measurement. In Y. Aït-Sahalia & L.P. Hansen (eds.), Handbook of Financial Econometrics. North-Holland (forthcoming).
Andersen, T.G., T. Bollerslev, F.X. Diebold, & H. Ebens (2001) The distribution of realized stock return volatility. Journal of Financial Economics 61, 4376.Google Scholar
Andersen, T.G., T. Bollerslev, F.X. Diebold, & F. Labys (2001) The distribution of realized exchange rate volatility. Journal of the American Statistical Association 96, 4255.Google Scholar
Asai, M. & M. McAleer (2003a) Trading Day Effects in Stochastic Volatility and Exponential GARCH Models. Manuscript, Faculty of Economics, Tokyo Metropolitan University.
Asai, M. & M. McAleer (2003b) Dynamic Leverage and Threshold Effects in Stochastic Volatility Models. Manuscript, Faculty of Economics, Tokyo Metropolitan University.
Asai, M. & M. McAleer (2004a) Dynamic Asymmetric Leverage in Stochastic Volatility Models. Manuscript, Faculty of Economics, Tokyo Metropolitan University.
Asai, M. & M. McAleer (2004b) Dynamic Correlations in Stochastic Volatility Models. Manuscript, Faculty of Economics, Tokyo Metropolitan University.
Asai, M. & M. McAleer (2004c) Multivariate Asymmetric Stochastic Volatility Models. Manuscript, Faculty of Economics, Tokyo Metropolitan University.
Barndorff-Nielsen, O.E. & N. Shephard (2002a) Econometric analysis of realised volatility and its use in estimating stochastic volatility models. Journal of the Royal Statistical Society, Series B 64, 253280.Google Scholar
Barndorff-Nielsen, O.E. & N. Shephard (2002b) Estimating quadratic variation using realized variance. Journal of Applied Econometrics 17, 457478.Google Scholar
Berg, A., R. Meyer, & J. Yu (2004) Deviance information criterion for comparing stochastic volatility models. Journal of Business & Economic Statistics 22, 107120.Google Scholar
Billio, M. & M. Caporin (2004) A Generalised Dynamic Conditional Correlation Model for Portfolio Risk Evaluation. Manuscript, Department of Economics, University of Venice “Ca' Foscari.”
Billio, M., M. Caporin, & M. Gobbo (2004) Flexible Dynamic Conditional Correlation Multivariate GARCH for Asset Allocation. Manuscript, Department of Economics, University of Venice “Ca' Foscari.”
Black, F. (1976) Studies of stock market volatility changes. In 1976 Proceedings of the American Statistical Association, Business and Economic Statistics Section, pp. 177181.
Bollerslev, T. (1986) Generalised autoregressive conditional heteroscedasticity. Journal of Econometrics 31, 307327.Google Scholar
Bollerslev, T. (1990) Modelling the coherence in short-run nominal exchange rates: A multivariate generalized ARCH approach. Review of Economics and Statistics 72, 498505.Google Scholar
Bollerslev, T., R.F. Engle, & J.M. Wooldridge (1988) A capital asset pricing model with time varying covariance. Journal of Political Economy 96, 116131.Google Scholar
Boussama, F. (2000) Asymptotic normality for the quasi-maximum likelihood estimator of a GARCH model. Comptes Rendus de l'Academie des Sciences, Serie I 331, 8184 (in French).Google Scholar
Caporin, M. & M. McAleer (2004a) Dynamic Asymmetric GARCH. Manuscript, Department of Economics, University of Venice “Ca' Foscari.”
Caporin, M. & M. McAleer (2004b) DAMGARCH: A Dynamic Asymmetric Multivariate GARCH Model. Manuscript, Department of Economics, University of Venice “Ca' Foscari.”
Cappiello, L., R.F. Engle, & K. Sheppard (2003) Asymmetric Dynamics in the Correlations of Global Equity and Bond Returns. European Central Bank Working paper 204.
Carnero, M.A., D. Pena, & E. Ruiz (2004) Persistence and kurtosis in GARCH and stochastic volatility models. Journal of Financial Econometrics 2, 319342.Google Scholar
Chan, D., R. Kohn, & C. Kirby (2003) Multivariate Stochastic Volatility with Leverage. Manuscript, School of Economics, University of New South Wales.
Chan, F., S. Hoti, & M. McAleer (2002) Structure and Asymptotic Theory for Multivariate Asymmetric Volatility: Empirical Evidence for Country Risk Ratings. Paper presented to the 2002 Australasian Meeting of the Econometric Society, Brisbane, Australia, July 2002.
Chan, F., S. Hoti, & M. McAleer (2003) Generalized Autoregressive Conditional Correlation. Manuscript, School of Economics and Commerce, University of Western Australia.
Chib, S., F. Nardari, & N. Shephard (2001) Analysis of High Dimensional Multivariate Stochastic Volatility Models. Manuscript, School of Business, Washington University, St. Louis.
Chib, S., F. Nardari, & N. Shephard (2002) Markov chain Monte Carlo methods for stochastic volatility models. Journal of Econometrics 108, 281316.Google Scholar
Chow, G.C. (1960) Tests of equality between sets of coefficients in two linear regressions. Econometrica 28, 591605.Google Scholar
Christie, A.A. (1982) The stochastic behavior of common stock variances: Value, leverage and interest rate effects. Journal of Financial Economics 10, 407432.Google Scholar
Comte, F. & O. Lieberman (2003) Asymptotic theory for multivariate GARCH processes. Journal of Multivariate Analysis 84, 6184.Google Scholar
Danielsson, J. (1994) Stochastic volatility in asset prices: Estimation with simulated maximum likelihood. Journal of Econometrics 64, 375400.Google Scholar
Danielsson, J. (1998) Multivariate stochastic volatility models: Estimation and a comparison with VGARCH models. Journal of Empirical Finance 5, 155173.Google Scholar
Dharmapala, D. & M. McAleer (1996) Econometric methodology and the philosophy of science. Journal of Statistical Planning and Inference 49, 937.Google Scholar
Ding, Z., C.W.J. Granger, & R.F. Engle (1993) A long memory property of stock market returns and a new model. Journal of Empirical Finance 1, 83106.Google Scholar
Drost, F. & B. Werker (1996) Closing the GARCH gap: Continuous-time GARCH modeling. Journal of Econometrics 74, 3157.Google Scholar
Engle, R.F. (1982) Autoregressive conditional heteroscedasticity with estimates of the variance of United Kingdom inflation. Econometrica 50, 9871007.Google Scholar
Engle, R.F. (2002) Dynamic conditional correlation: A simple class of multivariate generalized autoregressive conditional heteroskedasticity models. Journal of Business & Economic Statistics 20, 339350.Google Scholar
Engle, R.F. & K.F. Kroner (1995) Multivariate simultaneous generalized ARCH. Econometric Theory 11, 122150.Google Scholar
Engle, R.F. & J.R. Russell (1998) Autoregressive conditional duration: A new model for irregularly spaced transactions data. Econometrica 66, 11271162.Google Scholar
Engle, R.F. & K. Sheppard (2001) Theoretical and Empirical Properties of Dynamic Conditional Correlation Multivariate GARCH. Working paper 8554, National Bureau of Economic Research.
Fridman, M. & L. Harris (1998) A maximum likelihood approach for non-Gaussian stochastic volatility models. Journal of Business & Economic Statistics 16, 284291.Google Scholar
Glosten, L., R. Jagannathan, & D. Runkle (1992) On the relation between the expected value and volatility of nominal excess return on stock. Journal of Finance 46, 17791801.Google Scholar
Gourieroux, C., J. Jasiak, & R. Sufana (2004) The Wishart Autoregressive Process of Multivariate Stochastic Volatility. Manuscript, CRES and CEPREMAP.
Granger, C.W.J. & D.F. Hendry (2005) A dialogue concerning a new instrument for econometric modeling. Econometric Theory (this issue).Google Scholar
Hafner, C. & P.H. Franses (2003) A Generalized Dynamic Conditional Correlation Model for Many Asset Returns. Econometric Institute Report EI 2003-18, Erasmus University, Rotterdam.
Hall, P. & Q. Yao (2003) Inference in ARCH and GARCH models with heavy-tailed errors. Econometrica 71, 285317.Google Scholar
Hansen, P.R., A. Lunde, & J.M. Nason (2003) Choosing the best volatility models: The model confidence set approach. Oxford Bulletin of Economics and Statistics 65, 839861.Google Scholar
Harvey, A.C., E. Ruiz, & N. Shephard (1994) Multivariate conditional variance models. Review of Economic Studies 61, 247264.Google Scholar
Harvey, A.C. & N. Shephard (1996) Estimation of an asymmetric stochastic volatility model for asset returns. Journal of Business & Economic Statistics 14, 429434.Google Scholar
Jacquier, E., N.G. Polson, & P.E. Rossi (1994) Bayesian analysis of stochastic volatility models. Journal of Business & Economic Statistics 12, 371389.Google Scholar
Jacquier, E., N.G. Polson, & P. Rossi (1995) Models and Priors for Multivariate Stochastic Volatility. CIRANO Working paper 95s-18, Montreal.
Jacquier, E., N.G. Polson, & P. Rossi (1999) Stochastic Volatility: Univariate and Multivariate Extensions. Manuscript, Department of Finance, Boston College.
Jacquier, E., N.G. Polson, & P.E. Rossi (2004) Bayesian analysis of stochastic volatility models with fat-tails and correlated errors. Journal of Econometrics (forthcoming).Google Scholar
Jeantheau, T. (1998) Strong consistency of estimators for multivariate ARCH models. Econometric Theory 14, 7086.Google Scholar
Keuzenkamp, H. & M. McAleer (1995) Simplicity, scientific inference and econometric modelling. Economic Journal 105, 121.Google Scholar
Kim, S., N. Shephard, & S. Chib (1998) Stochastic volatility: Likelihood inference and comparison with ARCH models. Review of Economic Studies 65, 361393.Google Scholar
Kwan, C.K., W.K. Li, & K. Ng (2004) A Multivariate Threshold GARCH Model with Time-Varying Correlations. Manuscript, Department of Statistics and Actuarial Science, University of Hong Kong.
Liesenfeld, R. & J.-F. Richard (2003) Univariate and multivariate stochastic volatility models: Estimation and diagnostics. Journal of Empirical Finance 10, 505531.Google Scholar
Ling, S. & M. McAleer (2002a) Stationarity and the existence of moments of a family of GARCH processes. Journal of Econometrics 106, 109117.Google Scholar
Ling, S. & M. McAleer (2002b) Necessary and sufficient moment conditions for the GARCH(r,s) and asymmetric power GARCH(r,s) models. Econometric Theory 18, 722729.Google Scholar
Ling, S. & M. McAleer (2003) Asymptotic theory for a vector ARMA-GARCH model. Econometric Theory 19, 278308.Google Scholar
McAleer, M. (1994) Sherlock Holmes and the search for truth: A diagnostic tale. Journal of Economic Surveys 8, 317370. Reprinted in L. Oxley, D.A.R. George, C.J. Roberts, & S. Sayer (eds.), Surveys in Econometrics (Basil Blackwell, 1994), pp. 299–349.Google Scholar
McAleer, M., F. Chan, & D. Marinova (2002) An Econometric Analysis of Asymmetric Volatility: Theory and Application to Patents. Paper presented to the Australasian meeting of the Econometric Society, Brisbane, Australia, July 2002. Journal of Econometrics (forthcoming).Google Scholar
McAleer, M. & Y.K. Tse (1988) A sequential testing procedure for outliers and structural change. Econometric Reviews 7, 103111.Google Scholar
Meyer, R. & J. Yu (2004) Multivariate Stochastic Volatility Models: Bayesian Estimation and Model Comparison. Manuscript, School of Economics and Social Science, Singapore Management University.
Nelson, D.B. (1990) ARCH models as diffusion processes. Journal of Econometrics 45, 738.Google Scholar
Nelson, D.B. (1991) Conditional heteroscedasticity in asset returns: A new approach. Econometrica 59, 347370.Google Scholar
Omori, Y., S. Chib, N. Shephard, & J. Nakajima (2004) Stochastic Volatility with Leverage: Fast Likelihood Inference. Economics Working Paper 2004-W19, Nuffield College, Oxford.
Pantula, S.G. (1989) Estimation of autoregressive models with ARCH errors. Sankhya B 50, 119138.Google Scholar
Pitt, M.K. & N. Shephard (1999) Time-varying covariances: A factor stochastic volatility approach (with discussion). In J.M. Bernardo, J.O. Berger, A.P. Dawid, & A.F.M. Smith (eds.), Bayesian Statistics, vol. 6, pp. 547570. Oxford University Press.
Sakata, S. & H. White (1998) High breakdown point conditional dispersion estimation with application to S&P 500 daily returns volatility. Econometrica 66, 529567.Google Scholar
Samuelson, P.A. (1975) The art and science of macromodels over 50 years. In G. Fromm & L.R. Klein (eds.), The Brookings Model: Perspective and Recent Developments, pp. 310. North-Holland.
Sandmann, G. & S.J. Koopman (1998) Estimation of stochastic volatility models via Monte Carlo maximum likelihood. Journal of Econometrics 87, 271301.Google Scholar
Shephard, N. (1996) Statistical aspects of ARCH and stochastic volatility. In O.E. Barndorff-Nielsen, D.R. Cox, & D.V. Hinkley (eds.), Statistical Models in Econometrics, Finance and Other Fields, pp. 167. Chapman & Hall.
Shephard, N. & M.K. Pitt (1997) Likelihood analysis of non-Gaussian measurement time series. Biometrika 84, 653667. Correction (2004), 91, 249–250.Google Scholar
So, M.K.P., W.K. Li, & K. Lam (2002) A threshold stochastic volatility model. Journal of Forecasting 21, 473500.Google Scholar
Taylor, S.J. (1986) Modelling Financial Time Series. Wiley.
Taylor, S.J. (1994) Modelling stochastic volatility: A review and comparative study. Mathematical Finance 4, 183204.Google Scholar
Tsay, R.S. (1987) Conditional heteroscedastic time series models. Journal of the American Statistical Association 82, 590604.Google Scholar
Tse, Y.K. & A.K.C. Tsui (2002) A multivariate generalized autoregressive conditional heteroscedasticity model with time-varying correlations. Journal of Business & Economic Statistics 20, 351362.Google Scholar
Watanabe, T. (1999) A non-linear filtering approach to stochastic volatility models with an application to daily stock returns. Journal of Applied Econometrics 14, 101121.Google Scholar
Watanabe, T. & Y. Omori (2004) A multi-move sampler for estimating non-Gaussian time series models: Comments on Shephard & Pitt (1997). Biometrika 91, 246248.Google Scholar
Weiss, A.A. (1986) Asymptotic theory for ARCH models: Estimation and testing. Econometric Theory 2, 107131.Google Scholar
Yu, J. (2004a) On leverage in a stochastic volatility model. Journal of Econometrics (forthcoming).Google Scholar
Yu, J. (2004b) Asymmetric Response of Volatility: Evidence from Stochastic Volatility Models and Realized Volatility. Manuscript, School of Economics and Social Science, Singapore Management University.
Zellner, A., H.A. Keuzenkamp, & M. McAleer (2001), Simplicity, Inference and Modeling: Keeping It Sophisticatedly Simple. Cambridge University Press.