Guidi, Francesco (2010): Modelling and forecasting volatility of East Asian Newly Industrialized Countries and Japan stock markets with non-linear models.
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Abstract
This paper explores the forecasting performances of several non-linear models, namely GARCH, EGARCH, APARCH used with three distributions, namely the Gaussian normal, the Student-t and Generalized Error Distribution (GED). In order to evaluate the performance of the competing models we used the standard loss functions that is the Root Mean Squared Error, Mean Absolute Error, Mean Absolute Percentage Error and the Theil Inequality Coefficient. Our result show that the asymmetric GARCH family models are generally the best for forecasting NICs indices. We also find that both Root Mean Squared Error and Mean Absolute Error forecast statistic measures tend to choose models that were estimated assuming the normal distribution, while the other two remaining forecast measures privilege models with t-student and GED distribution.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | Modelling and forecasting volatility of East Asian Newly Industrialized Countries and Japan stock markets with non-linear models |
| Language: | English |
| Keywords: | GARCH; Volatility forecasting; forecast evaluation. |
| Subjects: | G - Financial Economics > G1 - General Financial Markets > G15 - International Financial Markets C - Mathematical and Quantitative Methods > C2 - Single Equation Models ; Single Variables > C22 - Time-Series Models ; Dynamic Quantile Regressions ; Dynamic Treatment Effect Models ; Diffusion Processes |
| Item ID: | 19851 |
| Depositing User: | Francesco Guidi |
| Date Deposited: | 08 Jan 2010 18:16 |
| Last Modified: | 03 Oct 2019 23:19 |
| References: | Andersen T.G., Bollerslev T. (1998), Answering the Skeptics: Yes, Standard Volatility Models do Provide Accurate Forecasts, International Economic Review, 39(4), 885-905. Baillie R.T., Bollerslev T. (1989). The message in Daily Exchange Rates: A Conditional Variance Tale, Journal of Business and Economic Statistics, 7, 297-305. Barkoulas J., Travlos N. (1998). Chaos in an emerging capital market? The case of the Athens Stock Exchange, Applied Financial Economics, 8, 231-243 Bollerslev, Tim, (1986), Generalized Autoregressive Conditional Heteroscedasticity, Journal of Econometrics, 31, 307-327. Brailsford T.J., Faff R.W. (1996), An evaluation of volatility forecasting techniques, Journal of Banking and Finance, 20, 419-438. Chan H., Fung D. (2007). Forecasting volatility of Hang Seng Index and its application on reserving for investment guarantees. Working paper- The Actuarial Society of Hong Kong. Chen A.S., (1997), Forecasting the S&P 500 Index Volatility, International Review of Economics and Finance, 6(4), 391-404. De Gooijer J-G-, Hyndman R.J., (2006), 25 years of time series forecasting, International Journal of Forecasting, 22, 443-473. Ding, Z., Granger, C. and Engle, R. (1993). A long memory property of stock returns and a new model, Journal of Empirical Finance, 1, 83-106. Engle, R.F., (1982). Autoregressive Conditional Heteroscedasticity with Estimates of the Variance of United Kingdom Inflation, Econometrica, 50, 987-1007. Engle R.F., Patton A.J. (2001). What good is a volatility model? Quantitative Finance, 1(2), 237-245 Fong W.M., Koh S.K. (2002). The political economy of volatility dynamics in the Hong kong stock market. Asia-Pacific Financial Markets, 9, 259-282. Franses P.H., Van Dijk D. (1996). Forecasting Stock Market Volatility Using (Non-Linear) Garch Models, Journal of Forecasting, 15, 229-235. Franses P.H., Ghijsels H. (1999). Additive outliers, GARCH and forecasting volatility, International Journal of Forecasting, 15, 1-9. Glosten, L.R., Jaganathan, R., Runkle D. (1993). On the relation between the Expected Value and the Volatility of the Normal Excess Return on Stocks, Journal of Finance, 48, 1779-1801. Hsieh D.A. (1989), Modelling Heteroskedsaticity in Daily Foreign Exchange Rates, Journal of Business and Economic Statistics, 7, 307-317. Kanas A., Yannopoulos A. (2001), Comparing linear and nonlinear forecasts for stock returns, International Review of Economics and Finance, 10, 383-398. Kim J., Kartsaklas A., Karanasos M. (2005). The volume-volatility relationship and the opening of the Korean stock market to foreign investors after the financial turmoil in 1997, Asia-Pacific Financial Markets, 12, 245-271. Lamoureux C., Lastrapes W. (1990). Persistence in Varaince Structural Cahnge, and the GARCH Model, Journal of Business and Economic Statistics, 8, 225-234. Liu W., Morley B. (2009), Volatility Forecasting in the Hang Seng Index using the GARCH Approach, Asia-Pacific Financial Markets, 16, 51-63. Mandelbrot, B. (1963). The variation of Certain Speculative Prices, Journal of Business, 36, 394-419. McCurdy T., Morgan I. (1988), testing the Martingale Hypothesis in Deutschemark Futures with Models Specifying the form of Heteroskedasticity, Journal of Applied Econometrics, 3, 187-202. Nelson, D. (1991), Conditional heteroskedasticity in asset returns: a new approach, Econometrica, 59, 349-370. Poon S.H., Granger C. (2003), Forecasting volatility in financial markets: a review, Journal of Economic Literature, XLI, 478-539 Selcuk F. (2005). Asymmetric Stochastic Volatility in Emerging Stock Markets, forthcoming in Applied Financial Economics. Thavaneswaran A., Appadoo S.S., Peiris S. (2005). Forecasting volatility, Statistics & Probability Letters, 75, 1-10. Xing X. (2004). Why does stock market volatility differ across countries? Evidence from thirty seven international markets, International Journal of business, 9(1), 84-102. Yu J. (2002), Forecasting volatility in the New Zealand stock market, Applied Financial Economics, 13, 193-202. |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/19851 |
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