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VaR Methodology for Non-Gaussian Finance

Author

Listed:
  • Marine Corlosquet-Habart

    (Lab-STICC_TB_CID_DECIDE - Lab-STICC - Laboratoire des sciences et techniques de l'information, de la communication et de la connaissance - UEB - Université européenne de Bretagne - European University of Brittany - ENIB - École Nationale d'Ingénieurs de Brest - UBO EPE - Université de Brest - Bretagne INP - Institut National Polytechnique de Bretagne - UBS - Université de Bretagne Sud - UBO EPE - Université de Brest - Télécom Bretagne - IBNM - Institut Brestois du Numérique et des Mathématiques - UBO EPE - Université de Brest - ENSTA Bretagne - École Nationale Supérieure de Techniques Avancées Bretagne - IMT - Institut Mines-Télécom [Paris] - CNRS - Centre National de la Recherche Scientifique, GEOARCHI - Géoarchitecture : Territoires, Urbanisation, Biodiversité, Environnement - UBS - Université de Bretagne Sud - UBO EPE - Université de Brest - IBSHS - Institut Brestois des Sciences de l'Homme et de la Société - UBO EPE - Université de Brest)

  • Jacques Janssen

    (ULB - Université libre de Bruxelles = Free University of Brussels)

  • Raimondo Manca

    (UNIROMA - Università degli Studi di Roma "La Sapienza" = Sapienza University [Rome])

Abstract

With the impact of the recent financial crises, more attention must be given to new models in finance rejecting "Black-Scholes-Samuelson" assumptions leading to what is called non-Gaussian finance. With the growing importance of Solvency II, Basel II and III regulatory rules for insurance companies and banks, value at risk (VaR) - one of the most popular risk indicator techniques plays a fundamental role in defining appropriate levels of equities. The aim of this book is to show how new VaR techniques can be built more appropriately for a crisis situation. VaR methodology for non-Gaussian finance looks at the importance of VaR in standard international rules for banks and insurance companies; gives the first non-Gaussian extensions of VaR and applies several basic statistical theories to extend classical results of VaR techniques such as the NP approximation, the Cornish-Fisher approximation, extreme and a Pareto distribution. Several non-Gaussian models using Copula methodology, Lévy processes along with particular attention to models with jumps such as the Merton model are presented; as are the consideration of time homogeneous and non-homogeneous Markov and semi-Markov processes and for each of these models.

Suggested Citation

  • Marine Corlosquet-Habart & Jacques Janssen & Raimondo Manca, 2013. "VaR Methodology for Non-Gaussian Finance," Post-Print hal-01196459, HAL.
    • Handle: RePEc:hal:journl:hal-01196459
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    Cited by:

    1. Niedrig, Tobias, 2015. "Optimal asset allocation for interconnected life insurers in the low interest rate environment under solvency regulation," SAFE Working Paper Series 97, Leibniz Institute for Financial Research SAFE.

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