References
- Acerbi, C. and Szekeley, B., Backtesting expected shortfall. Risk. December, 2014.
- Aigner, D.J., Amemiya, T. and Poirier, D.J., On the estimation of production Frontiers: Maximum likelihood estimation of the parameters of a discontinuous density function. Int. Econ. Rev., 1976, 17, 377–396.
- Alizadeh, S., Brandt, M.W. and Diebold, F.X., Range-based estimation of stochastic volatility models or exchange rate dynamics are more interesting than you think. J. Finance, 2002, 57, 1047–1092.
- Andersen, T. and Bollerslev, T., Answering the skeptics: Yes, standard volatility models do provide accurate forecasts. Int. Econ. Rev., 1998, 39, 885–905.
- Artzner, P., Delbaen, F., Eber, J.M. and Heath, D., Thinking coherently. Risk, 1997, 10, 68–71.
- Artzner, P., Delbaen, F., Eber, J.M. and Heath, D., Coherent measures of risk. Math. Finance, 1999, 9, 203–228.
- Barndorff-Nielsen, O.E., Hansen, P.R., Lunde, A. and Shephard, N., Regular and modified kernel-based estimators of integrated variance: The case with independent noise. CAF, Centre for Analytical Finance, 2004.
- Chang, C.L., Jiménez-Martín, J.Á., McAleer, M. and Pérez-Amaral, T., Risk management of risk under the Basel Accord: Forecasting value-at-risk of VIX futures. Manage. Finance, 2011, 37,1088–1106.
- Chen, Q. and Gerlach, R., The two-sided Weibull distribution and forecasting financial tail risk. Int. J. Forecasting, 2013, 29,527–540.
- Chen, C.W.S., Gerlach, R. and Lin, E.M.H., Volatility forecast using threshold heteroskedastic models of the intra-day range. Comput. Stat. Data Anal., 2008, 52, 2990–3010. Statistical & Computational Methods in Finance.
- Chen, Q., Gerlach, R. and Lu, Z., Bayesian value-at-risk and expected shortfall forecasting via the asymmetric Laplace distribution. Comput. Stat. Data Anal., 2012, 56, 3498–3516.
- Chen, C.W.S. and So, M.K.P., On a threshold heteroscedastic model. Int. J. Forecasting, 2006, 22, 73–89.
- Christoffersen, P., Evaluating interval forecasts. Int. Econ. Rev., 1998, 39, 841–862.
- Christensen, K. and Podolskij, M., Realized range-based estimation of integrated variance. J. Econom., 2007, 141(2), 323–349.
- Costanzino, N. and Curran, M., Backtesting general spectral risk measures with application to expected shortfall. J. Risk Model Validat., March 2015, 21–31.
- Du, Z. and Escanciano, J.C., Backtesting expected shortfall: Accounting for tail risk. Social Science Research Network Paper 2548544, 2015. Available online at: http://dx.doi.org/10.2139/ssrn.2548544.
- Efron, B. and Tibshirani R.J., An Introduction to the Bootstrap, 1993 (Chapman and Hall: New York.
- Engle, R.F. and Manganelli, S., CAViaR: Conditional autoregressive value at risk by regression quantiles. J. Bus. Econ. Stat., 2004, 22, 367–381.
- Feller, W., The asymptotic distribution of the range of sums of random variables. Ann. Math. Stat., 1951, 22, 427–32.
- Fissler, T. and Ziegel, J.F., Higher order eligibility and Osband’s principle. Ann. Stat., 2016, in press.
- Fissler, T., Ziegel, J.F. and Gneiting, T., Expected shortfall is jointly elicitable with value at risk -- Implications for backtesting, 2015. arXiv.org. Available online at: http://arxiv.org/abs/1507.00244.
- Gaglianone, W., Lima, L., Linton, O. and Smith, D., Evaluating value-at-risk models via quantile regression. J. Bus. Econ. Stat., 2011, 29(1), 150–160.
- Garman, M.B. and Klass, M.J., On the estimation of price volatility from historical data. J. Bus., 1980, 53, 67–78.
- Gelman, A., Carlin, J.B., Stern, H.S. and Rubin, D.B., Bayesian Data Analysis, 2nd ed., 2005 (Chapman & Hall: Boca Raton, FL).
- Gelman, A., Roberts, G.O. and Gilks, W.R., Efficient Metropolis jumping rules. In Bayesian Statistics, edited by J.M. Bernardo, J.O. Berger, A.P. Dawid and A.F.M. Smith, pp. 599-608, 1996 (Clarendon: Oxford).
- Gerlach, R. and Chen, C.W.S., Bayesian expected shortfall forecasting incorporating the intra-day range. J. Financ. Econom., 2016, 14(1), 128–158.
- Gerlach, R. and Wang, C., Forecasting risk via realized GARCH, incorporating the realized range. Quant. Finance, 2016, 16(4),501–511.
- Gneiting, T., Making and evaluating point forecasts. J. Am. Stat. Assoc., 2011, 106, 746–762.
- Hastings, W.K., Monte-Carlo sampling methods using Markov Chains and their applications. Biometrika, 1970, 57, 97–109.
- Hansen, P.R., Huang, Z. and Shek, H.H., Realized GARCH: A joint model for returns and realized measures of volatility. J. Appl. Econ., 2011, 27(6), 877-906.
- Hoogerheide, L.F., Kaashoek, J.F. and van Dijk, H.K., On the shape of posterior densities and credible sets in instrumental variable regression models with reduced rank: An application of flexible sampling methods using neural networks. J. Econom., 2007, 5,1–11.
- Kerkhof, F.L.J. and Melenberg, B., Backtesting for risk-based regulatory capital. J. Bank. Finance, 2004, 28, 1845–1865.
- Kupiec, P.H., Techniques for verifying the accuracy of risk measurement models. J. Deriv., 1995, 3, 73–84.
- Malevergne, Y. and Sornette, D., VaR-efficient portfolios for a class of super and sub-exponentially decaying assets return distributions. Quant. Finance, 2004, 4, 17–36.
- Martens, M. and van Dijk, D., Measuring volatility with the realized range. J. Econom., 2007, 138(1), 181–207.
- McAleer, M., Jiménez-Martín, J.Á. and Pérez-Amaral, T., GFC-robust risk management strategies under the Basel Accord. Int. Rev. Econ. Finance, 2013, 27, 97–111.
- McNeil, A.J. and Frey, R., Estimation of tail-related risk measures for heteroscedastic financial time series: An extreme value approach. J. Empir. Finance, 2000, 7, 271–300.
- Metropolis, N., Rosenbluth, A.W., Rosenbluth, M.N., Teller, A.H. and Teller, E., Equation of state calculations by fast computing machines. J. Chem. Phys., 1953, 21, 1087–1092.
- Molnár, P., Properties of range-based volatility estimators. Int. Rev. Financ. Anal., 2012, 23, 20–29.
- Newey, W.K. and Powell, J.L., Asymmetric least squares estimation and testing. Econometrica, 1987, 55, 819–847.
- Parkinson, M., The extreme value method for estimating the variance of the rate of return. J. Bus., 1980, 53, 61–65.
- Rogers, L.C.G. and Satchell, S.E., Estimating variance from high, low and closing prices. Ann. Appl. Probab., 1991, 1, 504–512.
- So, M.K.P. and Wong, C.M., Estimation of multiple period expected shortfall and median shortfall for risk management. Quant. Finance, 2012, 12(5), 739–754.
- Taylor, J., Estimating value at risk and expected shortfall using expectiles. J. Financ. Econom., 2008, 6, 231–252.
- Wong, W.K., Backtesting trading risk of commercial banks using expected shortfall. J. Bank. Finance, 2008, 32, 1404–1415.
- Yang, D. and Zhang, Q., Drift-independent volatility estimation based on high, low, open, and close prices. J. Bus., 2000, 73, 477–491.
- Zhang, L., Mykland, P.A. and Aït-Sahalia, Y., A tale of two time scales. J. Am. Stat. Assoc., 2005, 100, 1394–1411.