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Extreme events in finance :...
"A guide to the growing importance of extreme value risk theory, methods, and applications in the financial sector Presenting a uniquely accessible guide, Extreme Events in Finance: A Handbook of Extreme Value Theory and its Applications features a combination of the theory, methods, and applications of extreme value theory (EVT) in finance as well as a practical understanding of market behavior including both ordinary and extraordinary conditions. Beginning with a fascinating history of EVTs and financials modeling, the handbook introduces the historical implications that resulted in the applications and then clearly examines the fundamental results of EVT in finance. After dealing with these theoretical results, the handbook focuses on the EVT methods critical for data analysis. Finally, the handbook features the practical applications and techniques, and how these can be implemented in financial markets."--
"Extreme Events in Finance: A Handbook of Extreme Value Theory and its Applications features a combination of the theory, methods, and applications of extreme value theory (EVT) in finance as well as a practical understanding of market behavior including both ordinary and extraordinary conditions"--
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Rebiun24545264
https://catalogo.rebiun.org/rebiun/record/Rebiun24545264
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Extreme events in finance
a handbook of extreme value theory and its applications
edited by François Longin
Hoboken
Wiley
2016
Hoboken
Hoboken
Wiley
1 online resource
1 online resource
Text
txt
rdacontent
computer
c
rdamedia
online resource
cr
rdacarrier
Wiley handbooks in financial engineering and econometrics
Includes bibliographical references and index
1. Introduction 1.1 Extremes 1.2 History 1.3 Extreme value theory 1.4 Statistical estimation of extremes 1.5 Applications in finance 1.6 Practitioners' points of view 1.7 Final words 1.8 Thank you note References 2. Extremes under Dependence -- historical development and parallels with central limit theory 2.1 Introduction 2.2 Classical (iid) Central Limit and Extreme Value Theories 2.3 Exceedances of levels, kth largest values 2.4 CLT and EVT for stationary sequences, Bernstein's blocks, Strong mixing 2.5 Weak distributional mixing for EVT, D(un), Extremal Index 2.6 Point process of level exceedances 2.7Continuous parameter extremes 2.8 References 3. The Extreme Value Problem in Finance: Comparing the Pragmatic Programme with the Mandelbrot Programme 3.1 The extreme value puzzle in financial modelling 3.2 The Sato classification and the two programmes 3.3 Mandelbrot's programme: a fractal approach 3.4 The pragmatic programme: a data-driven approach 3.5 Conclusion References 4. Extreme Value Theory: An Introductory Overview 4.1 Introduction 4.2 Univariate Case 4.3 Multivariate Case -- some highlights 4.4 Further reading Acknowledgements References 5. The estimation of the extreme value index 5.1 Introduction 5.2 The main limit theorem behind extreme value theory 5.3 Characterizations of the max-domains of attraction and extreme value index estimators 5.4 Consistency and asymptotic normality of the estimators 5.5 Second order bias reduced estimation 5.6 The case study 5.7 Other topics and comments References 6. Bootstrap methods in statistics of extremes 6.1 Introduction 6.2 A few details on EVT 6.3 The bootstrap methodology in statistics of univariate extremes 6.4 Applications to simulated data 6.5 Concluding remarks References 7. Extreme values statistics for Markov chains with applications to Finance and Insurance 7.1 Introduction 7.2 On the (pseudo- ) regenerative approach for Markovian data 7.3 Preliminary results 7.4 Regeneration-based statistical methods for extremal events 7.5 The extremal index 7.6 The regeneration-based Hill estimator 7.7 Applications to ruin theory and Financial time series 7.8 An application to the CAC40 7.9 Conclusion References 8. Lévy Processes and Extreme Value Theory 8.1 Introduction 8.2 Extreme Value Theory 8.3 Infinite Divisibility and Lévy Processes 8.4 Heavy-Tailed Lévy Processes 8.5 Semi-Heavy Tailed Lévy Processes 8.6 Lévy Processes and Extreme Values 8.7 Conclusion References 9. Statistics of Extremes: Challenges and Opportunities 9.1 Introduction 9.2 Statistics of Bivariate Extremes 9.3 Models Based on Families of Tilted Measures 9.4 Miscellanea References 10. Measures of financial risk 10.1 Introduction 10.2 Traditional measures of risk 10.3 Risk estimation 10.4 "Technical Analysis" of financial data 10.5 Dynamic risk measurement 10.6 Open problems References 11. On the estimation of the distribution of aggregated heavy tailed risks. Application to risk measures 11.1 Introduction 11.2 A brief review of existing methods 11.3 New approaches -- mixed limit theorems 11.4 Application to risk measures and comparison 11.5 Conclusion References 12. Estimation methods for Value at Risk 12.1 Introduction 12.2 General properties 12.3 Parametric methods 12.4 Nonparametric methods 12.5 Semiparametric methods 12.6 Computer software 12.7 Conclusions Acknowledgments References 13. Comparing Tail Risk and Systemic Risk Profiles for Different Types of US Financial Institutions 13.1 Introduction 13.2 Tail risk and Systemic risk Indicators 13.3 Tail risk and systemic risk estimation 13.4 Empirical results 13.5 Conclusions References 14. Extreme Value Theory and Credit Spreads 13.1 Preliminaries 13.2 Tail behavior of credit markets 13.3 Some multivariate analysis 13.4 Approximating value-at-risk for credit portfolios 13.5 Other directions References 15. Extreme Value Theory and Risk Management in Electricity Markets 15.1 Introduction 15.2 Prior Literature 15.3 Specification of VaR Estimation Approaches 15.4 Empirical Analysis 15.5 Conclusion References 16. Margin Setting and Extreme Value Theory 16.1 Introduction 16.2 Margin Setting 16.3 Theory and Methods 16.4 Empirical Results 16.5 Conclusions References 17. The Sortino Ratio and Extreme Value Theory: An Application to Asset Allocation 17.1 Introduction 17.2 Data Definitions and Description 17.3 The Performance Ratios and Their Estimations 17.4 Performance Measurement Results and Implications 17.5 Concluding Remarks References 18. Portfolio Insurance: the Extreme Value Approach Applied to the CPPI Method 18.1 Introduction 18.2 The CPPI method 18.3 CPPI and Quantile Hedging 18.4 Conclusion References 19. The choice of the distribution of asset returns: How extreme value theory can help? Introduction 19.1 Extreme value theory 19.2 Estimation of the tail index 19.3 Application of extreme value theory to discriminate among distributions of returns 19.4 Empirical results 19.5 Conclusion References Appendix 20. Protecting Assets Under Non-Parametric Market Conditions 20.1 Investors "Known knowns" 20.2 Investors "Known unknowns" 20.3 Investors "Unknown knowns" 20.4 Investors "Unknown unknowns" References 21. EVT seen by a vet: A practitioner's experience on extreme value theory 21.1 What has
François Longin
Ross Leadbetter
Christian Walter
Isabel Fraga Alves and Cláudia Neves
Jan Beirlant, Klaus Herrmann, and Jozef Teugels
Ivette Gomes, Frederico Caeiro, Lígia Henriques-Rodrigues, and B.G. Manjunath
Patrice Bertail, Stéphan Clémençon, and Charles Tillier
Olivier Le Courtois and Christian Walter
Miguel de Carvalho
Serguei Novak
Marie Kratz
Saralees Nadarajah and Stephen Chan
Stefan Straetmans and Thanh Thi Huyen Dinh
Wesley Phoa
Kam Fong Chan and Philip Gray
John Cotter and Kevin Dowd
Geoffrey Booth and John Paul Broussard
Philippe Bertrand and Jean-Luc Prigent
François Longin
Jean-Marie Choffray et Charles Pahud de Mortanges
Jean-François Boulier