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The class of α-stable distributions is an attractive probabilistic model of asset returns distribution in the field of finance. When dealing with real issues, such as optimal portfolio selection, it is important that we can compute the Conditional Value-at-Risk (CVaR) accurately. The CVaR is also known as the expected tail loss (ETL) proposed in literature as a coherent risk measure. In our paper we propose an integral expression for the calculation of the CVaR of a stable law. We compare the current approach to some existing method and we demonstrate how to relate the derived result to some common multivariate distributional assumptions.
Czasopismo
Rocznik
Tom
Strony
1--22
Opis fizyczny
Bibliogr. 16 poz., tab., wykr.
Twórcy
autor
- FinAnalytica, Seattle, USA
- Faculty of Mathematics and Informatics, Sofia University, Bulgaria
autor
- School of Operations Research, Cornell University Ithaca, NY 14853, USA
- Industrial Engineering, Cornell University Ithaca, NY 14853, USA
- Department of Statistical Science, Cornell University Ithaca, NY 14853, USA
autor
- Department of Econometrics and Statistics, University of Karlsruhe, D-76128 Karlsruhe, Germany
- Department of Statistics and Applied Probability, University of California, Santa Barbara, CA 93106, USA
autor
- Department MSIA, University of Bergamo, Via dei Caniana, 2, 24127, Italy
Bibliografia
- [1] P. Artzner, F. Delbaen, J.-M. Eber and D. Heath, Thinking coherently, RISK 10 (11) (1997).
- [2] P. Artzner, F. Delbaen, J.-M. Eber and D. Heath, Coherent measures of risk, Math. Finance 9 (3) (1998), pp. 203-228.
- [3] A. Biglova, S. Ortobelli, S. Rachev and S. Stoyanov, New return-risk ratios and their optimality, Technical Report, Department of Econometrics, Statistics and Mathematical Finance, School of Economics and Business Engineering, University of Karlsruhe, Germany, 2004.
- [4] B. O. Bradley and M. S. Taqqu, Financial risk and heavy tails, in: Handbook of Heavy Tailed Distributions in Finance, Elsevier/North-Holland, 2003, pp. 35-103.
- [5] D. J. Buckle, Bayesian inference for stable distributions, JASA 90 (1995), pp. 605-613.
- [6] F. Delbaen, Coherent risk measures on general probability spaces, Math. Finance 9 (3), (1998), pp. 203-228.
- [7] P. Embrechts, F. Lindskog and A. McNeil, Modelling dependence with copulas and application to risk management, in: Handbook of Heavy Tailed Distributions in Finance, Elsevier/North-Holland, 2003, pp. 329-385.
- [8] R. D. Martin, S. T. Rachev and F. Siboulet, Phi-alpha optimal portfolios and extreme risk management, Wilmott, November, 2003, pp. 70-83.
- [9] J. P. Nolan, Numerical computation of stable densities and distribution functions, Stoch. Models 13 (1997), pp. 759-774.
- [10] S. Ortobelli, I. Huber, S. X- Rachev and E. Schwartz, Portfolio choice theory with non-Gaussian distributed returns, in: Handbook of Heavy Tailed Distributions in Finance, Elsevier/North-Holland, 2003, pp. 547-594.
- [11] S. T. Rachev (Ed.), Handbook of Heavy Tailed Distributions in Finance, Elsevier/North- Holland, 2003.
- [12] S. T. Rachev and S. Mittnik, Stable Paretian Models in Finance, Wiley, 2000.
- [13] G. Samorodnitsky and M. S. Taqqu, Stable Non-Gaussian Random Processes, Stochastic Models with Infinite Variance, Chapman and Hall, New York-London 1994.
- [14] Y. Yamai and T. Yoshiba, On the validity of Value-at-Risk: Comparative analyses with expected shortfall, Monetary and Economic Studies 20 (1) (2002a), Institute for Monetary and Economic Studies, Bank of Japan, pp. 57-86.
- [15] Y. Yamai and T. Yoshiba, Comparative analyses of expected shortfall and Value-at-Risk: Their estimation error, decomposition and optimization, Monetary and Economic Studies 20 (1) (2002b), Institute for Monetary and Economic Studies, Bank of Japan, pp. 87-122.
- [16] V. M. Zolotarev, One-Dimensional Stable Distributions, Transí. Math. Monogr. No 65, Providence, RI, 1986. Translation of the original 1983 Russian edition.
Typ dokumentu
Bibliografia
Identyfikator YADDA
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