Backtesting Value-at-Risk Based on Tail Losses

Extreme losses caused by leverage and financial derivatives highlight the need to backtest Value-at-Risk (VaR) based on the sizes of tail losses, because the risk measure currently used disregards losses beyond the VaR boundary. While Basel II backtests VaR by counting the number of exceptions, this paper proposes to use the saddlepoint technique by summing the sizes of tail losses. Monte Carlo simulations show that the technique is extremely accurate and powerful, even for small samples. Empirical applications for the proposed backtest find substantial downside tail risks in S&P 500, and demonstrate that risk models which account for jumps, skewed and fat-tailed distributions failed to capture the tail risk during the 1987 stock market crash. Finally, the saddlepoint technique is used to derive a multiplication factor for any risk capital requirement that is responsive to the sizes of tail losses.

[1]  Suleyman Basak,et al.  Value-at-Risk Based Risk Management: Optimal Policies and Asset Prices , 1999 .

[2]  H. Daniels Saddlepoint Approximations in Statistics , 1954 .

[3]  Thomas H. McCurdy,et al.  News Arrival, Jump Dynamics and Volatility Components for Individual Stock Returns , 2003 .

[4]  Anthony S. Tay,et al.  Evaluating Density Forecasts , 1997 .

[5]  Marc S. Paolella,et al.  Diagnosing and treating the fat tails in financial returns data , 2000 .

[6]  Kevin Dowd,et al.  Estimating VaR with Order Statistics , 2001 .

[7]  Neil D. Pearson,et al.  Value at Risk , 2000 .

[8]  F. Diebold,et al.  How Relevant is Volatility Forecasting for Financial Risk Management? , 1997 .

[9]  Philippe Artzner,et al.  Coherent Measures of Risk , 1999 .

[10]  Philippe Jorion,et al.  Risk Management Lessons from Long-Term Capital Management , 1999 .

[11]  Jeremy Berkowitz Testing Density Forecasts, With Applications to Risk Management , 2001 .

[12]  Jun Pan The jump-risk premia implicit in options: evidence from an integrated time-series study $ , 2002 .

[13]  Jinyong Hahn,et al.  Série Scientifique Scientific Series Testing and Comparing Value-at-risk Measures , 2022 .

[14]  S. Laurent,et al.  Value-at-Risk for long and short trading positions , 2003 .

[15]  H. E. Daniels,et al.  Tail Probability Approximations , 1987 .

[16]  Peter F. Christoffersen Evaluating Interval Forecasts , 1998 .

[17]  V. Agarwal,et al.  Risks and Portfolio Decisions Involving Hedge Funds , 2004 .

[18]  David A. Hsieh,et al.  Implications of Nonlinear Dynamics for Financial Risk Management , 1993, Journal of Financial and Quantitative Analysis.

[19]  L. Summers International Financial Crises: Causes, Prevention, and Cures , 2000 .

[20]  S. Rice,et al.  Saddle point approximation for the distribution of the sum of independent random variables , 1980, Advances in Applied Probability.

[21]  Yasuhiro Yamai,et al.  Value-at-risk versus expected shortfall: A practical perspective , 2005 .

[22]  Bertrand Melenberg,et al.  Backtesting for Risk-Based Regulatory Capital , 2002 .

[23]  Pierre Giot,et al.  Modelling daily value-at-risk using realized volatility and arch type models , 2001 .

[24]  J. Maheu,et al.  Conditional Jump Dynamics in Stock Market Returns , 2002 .

[25]  杜化宇,et al.  Value-at-Risk for Long and Short Positions of Asian Stock Markets , 2008 .

[26]  G. Szegö Measures of risk , 2002 .

[27]  Jeremy Berkowitz,et al.  How Accurate are Value-at-Risk Models at Commercial Banks , 2001 .

[28]  Estimation of Value-at-Risk under jump dynamics and asymmetric information , 2005 .

[29]  Jón Dańıelsson,et al.  Comparing downside risk measures for heavy tailed distributions , 2006 .

[30]  E. Eberlein,et al.  New Insights into Smile, Mispricing, and Value at Risk: The Hyperbolic Model , 1998 .

[31]  Luc Bauwens,et al.  A New Class of Multivariate Skew Densities, With Application to Generalized Autoregressive Conditional Heteroscedasticity Models , 2005 .

[32]  Paul H. Kupiec,et al.  Techniques for Verifying the Accuracy of Risk Measurement Models , 1995 .

[33]  C. Klüppelberg,et al.  Modelling Extremal Events , 1997 .

[34]  J. Rosenberg,et al.  A General Approach to Integrated Risk Management with Skewed, Fat-Tailed Risk , 2004 .

[35]  Kevin Dowd Using Order Statistics to Estimate Confidence Intervals for Probabilistic Risk Measures , 2006 .

[36]  A. McNeil,et al.  Estimation of tail-related risk measures for heteroscedastic financial time series: an extreme value approach , 2000 .

[37]  Are Jumps in Stock Returns Diversifiable? Evidence and Implications for Option Pricing , 1994 .

[38]  Atsuyuki Naka,et al.  Changing Risk, Return, and Leverage: The 1997 Asian Financial Crisis , 2004, Journal of Financial and Quantitative Analysis.

[39]  P. Embrechts,et al.  Risk Management: Correlation and Dependence in Risk Management: Properties and Pitfalls , 2002 .