Expected shortfall estimation for apparently infinite-mean models of operational risk

Statistical analyses on actual data depict operational risk as an extremely heavy-tailed phenomenon, able to generate losses so extreme as to suggest the use of infinite-mean models. But no loss can actually destroy more than the entire value of a bank or of a company, and this upper bound should be considered when dealing with tail-risk assessment. Introducing what we call the dual distribution, we show how to deal with heavy-tailed phenomena with a remote yet finite upper bound. We provide methods to compute relevant tail quantities such as the Expected Shortfall, which is not available under infinite-mean models, allowing adequate provisioning and capital allocation. This also permits a measurement of fragility. The main difference between our approach and a simple truncation is in the smoothness of the transformation between the original and the dual distribution. Our methodology is useful with apparently infinite-mean phenomena, as in the case of operational risk, but it can be applied in all those situations involving extreme fat tails and bounded support.

[1]  Paul Embrechts,et al.  An Extreme Value Approach for Modeling Operational Risk Losses Depending on Covariates , 2016 .

[2]  Gareth W. Peters,et al.  Advances in Heavy Tailed Risk Modeling: A Handbook of Operational Risk , 2015 .

[3]  J. Beirlant,et al.  Extreme value statistics for truncated Pareto-type distributions , 2014, 1410.4097.

[4]  Ludger Rüschendorf,et al.  Asymptotic Equivalence of Conservative Value-at-Risk- and Expected Shortfall-Based Capital Charges , 2014 .

[5]  Paola Schwizer,et al.  Reputational losses and operational risk in banking , 2014 .

[6]  P. Silvapulle,et al.  A semi-parametric approach to estimating the operational risk and Expected Shortfall , 2013 .

[7]  Pasquale Cirillo,et al.  Are your data really Pareto distributed , 2013, 1306.0100.

[8]  P. Ruckdeschel,et al.  Optimally robust estimators in generalized Pareto models , 2010, 1005.1476.

[9]  N. Taleb,et al.  Mathematical definition, mapping, and detection of (anti)fragility , 2012, 1208.1189.

[10]  Claudia Klüppelberg,et al.  Multivariate models for operational risk , 2010 .

[11]  M. Weitzman,et al.  On Modeling and Interpreting the Economics of Catastrophic Climate Change , 2009, The Review of Economics and Statistics.

[12]  Mark E. J. Newman,et al.  Power-Law Distributions in Empirical Data , 2007, SIAM Rev..

[13]  Christine M. Anderson-Cook,et al.  Book review: quantitative risk management: concepts, techniques and tools, revised edition, by A.F. McNeil, R. Frey and P. Embrechts. Princeton University Press, 2015, ISBN 978-0-691-16627-8, xix + 700 pp. , 2017, Extremes.

[14]  P. Embrechts,et al.  Quantitative models for operational risk: Extremes, dependence and aggregation , 2006 .

[15]  V. Yohai,et al.  Robust Statistics: Theory and Methods , 2006 .

[16]  Paul Embrechts,et al.  Infinite-mean models and the LDA for operational risk , 2006 .

[17]  M. Meerschaert,et al.  Parameter Estimation for the Truncated Pareto Distribution , 2006 .

[18]  L. Haan,et al.  Extreme value theory : an introduction , 2006 .

[19]  J. M. Porrà The (mis)Behavior of Markets , 2006 .

[20]  P. Embrechts,et al.  Quantitative Risk Management: Concepts, Techniques, and Tools , 2005 .

[21]  Marco Moscadelli,et al.  The Modelling of Operational Risk: Experience with the Analysis of the Data Collected by the Basel Committee , 2004 .

[22]  Eric S. Rosengren,et al.  Capital and Risk: New Evidence on Implications of Large Operational Losses , 2003 .

[23]  S. Kotz,et al.  Statistical Size Distributions in Economics and Actuarial Sciences , 2003 .

[24]  K. Campbell Statistical Analysis of Extreme Values , 2002, Technometrics.

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

[26]  S. G. Coles Review of laws of small numbers: extremes and rare events by Falk, Husler and Reiss. , 1996 .

[27]  J. Hüsler,et al.  Laws of Small Numbers: Extremes and Rare Events , 1994 .

[28]  J. Pickands Statistical Inference Using Extreme Order Statistics , 1975 .

[29]  L. Haan,et al.  Residual Life Time at Great Age , 1974 .

[30]  Alan Stuart,et al.  Statistics of extremes , 1960 .

[31]  B. Gnedenko Sur La Distribution Limite Du Terme Maximum D'Une Serie Aleatoire , 1943 .