___

• McNeil, A. J., & Frey, R., Estimation of tail-related risk measures for heteroscedastic financial time series: an extreme value approach. Journal of empirical finance, 7(3), (2000), 271-300.
• Gencay, R., & Selcuk, F., Extreme value theory and Value-at-Risk: Relative performance in emerging markets. International Journal of Forecasting, 20(2), (2004), 287-303.
• Gilli, M., An application of extreme value theory for measuring financial risk. Computational Economics, 27(2-3), (2006), 207-228.
• Onour, I. A., Extreme risk and fat-tails distribution model: empirical analysis. Journal of Money, Investment and Banking, (13), (2010).
• Singh, A. K., Allen, D. E., & Robert, P. J., Extreme market risk and extreme value theory. Mathematics and computers in simulation, 94, (2013), 310-328.
• Soltane, H. B., Karaa, A., & Bellalah, M., Conditional VaR Using GARCH-EVT Approach: Forecasting Volatility in Tunisian Financial Market.Journal of Computations & Modelling, 2(2), (2012), 95-115.
• Chan, K. F., & Gray, P., Using extreme value theory to measure value-at-risk for daily electricity spot prices. International Journal of Forecasting,22(2), (2006), 283-300.
• Karmakar, M., Estimation of tail-related risk measures in the Indian stock market: An extreme value approach. Review of Financial Economics,22(3), (2013), 79-85.
• Altun, E., & Tatlidil, H., A Comparison of Extreme Value Theory with Heavy-tailed Distributions in Modeling Daily VAR. Journal of Finance and Investment Analysis, 4(2), (2015),69-83
• Venkataraman, S., Value at risk for a mixture of normal distributions: the use of quasi-Bayesian estimation techniques. Economic Perspectives-Federal Reserve Bank of Chicago, 21, (1997), 2-13.
• Zangari, P., An improved methodology for measuring VaR. RiskMetrics Monitor, 2(1), (1996), 7-25.
• Lee, M. C., Su, J. B., & Liu, H. C., Value-at-risk in US stock indices with skewed generalized error distribution. Applied Financial Economics Letters, 4(6), (2008), 425-431.
• Angelidis, T., Benos, A., & Degiannakis, S., The use of GARCH models in VaR estimation. Statistical methodology, 1(1), (2004), 105-128.
• Daubechies, I., Ten lectures on wavelets, Philadelphia: Society for industrial and applied mathematics, 61, (1992), 198-202.
• Chui, C. K. (1992). An Introduction to Wavelets, Philadelphia, SIAM, 38, (1992).
• Graps, A., An introduction to wavelets. Computational Science & Engineering, IEEE, 2(2), (1995), 50-61.
• Chi, X., & Kai-jian, H., Wavelet denoised value at risk estimate. In Management Science and Engineering, ICMSE'06, IEEE, (2006), 1552-1557
• Lai, K. K., He, K., Xie, C., & Chen, S., Market risk measurement for crude oil: a wavelet based var approach. IJCNN'06, IEEE, (2006), 2129-2136.
• Samia, M., Dalenda, M., & Saoussen, A., Accuracy and Conservatism of VaR Models: A Wavelet Decomposed VaR Approach Versus Standard ARMA-GARCH Method. International Journal of Economics and Finance, 1(2), (2009).
• Tan, Z., Zhang, J., Wang, J., & Xu, J., Day-ahead electricity price forecasting using wavelet transform combined with ARIMA and GARCH models. Applied Energy, 87(11), (2010), 3606-3610.
• Cifter, A., Value-at-risk estimation with wavelet-based extreme value theory: Evidence from emerging markets. Physica A: Statistical Mechanics and its Applications, 390(12), (2011), 2356-2367.
• Balkema, A. A., & De Haan, L., Residual life time at great age. The Annals of probability, (1974), 792-804.
• Pickands III, J., Statistical inference using extreme order statistics. the Annals of Statistics, (1975), 119-131.
• Engle, R. F., Autoregressive conditional heteroscedasticity with estimates of the variance of United Kingdom inflation. Econometrica: Journal of the Econometric Society, (1982), 987-1007.
• Bollerslev, T., Generalized autoregressive conditional heteroskedasticity. Journal of econometrics, 31(3), (1986), 307-327.
• Bollerslev, T., A conditionally heteroskedastic time series model for speculative prices and rates of return. The review of economics and statistics, (1987), 542-547.
• Nelson, D. B., Conditional heteroskedasticity in asset returns: A new approach. Econometrica: Journal of the Econometric Society, (1991), 347-370.
• Lee, M. C., Su, J. B., & Liu, H. C., Value-at-risk in US stock indices with skewed generalized error distribution. Applied Financial Economics Letters, 4(6), (2008), 425-431.
• Hamburger, Y., Wavelet-based Value at Risk Estimation: A Multiresolution Approach. Erasmus Universiteit, (2003).
• Ramsey, J. B., The contribution of wavelets to the analysis of economic and financial data. Philosophical Transactions of the Royal Society of London A: Mathematical, Physical and Engineering Sciences, 357(1760), (1999), 2593-2606.
• Cornish, C. R., Bretherton, C. S., & Percival, D. B., Maximal overlap wavelet statistical analysis with application to atmospheric turbulence.Boundary-Layer Meteorology, 119(2), (2006), 339-374.
• Kupiec, P. H., Techniques for verifying the accuracy of risk measurement models. THE J. OF DERIVATIVES, 3(2), (1995)