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Extension of the Capital Asset Pricing Model to Non-normal Dependence Structures

Published online by Cambridge University Press:  17 April 2015

Mark Johnston
Mark Johnston*
Affiliation:
PricewaterhouseCoopers, GPO Box 2650, Sydney NSW 1171, Australia and University of New South Wales, Sydney NSW 2052, Australia, E-mail: m.e.johnston@unsw.edu.au
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Abstract

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The Capital Asset Pricing Model arises in an economy where agents have exponential utility functions and aggregate consumption is normally distributed, and gives the prices of assets with payoffs which are jointly normal with consumption. Such assets have normal marginal distributions and have dependence with consumption characterised by a normal copula. Wang has derived a transform which extends the CAPM by allowing pricing of assets in such an economy which have non-normal marginal distributions but still are normal-copula with consumption.

Here we set out the stochastic discount factors corresponding to this version of the CAPM and to Wang’s transform, and show how to calculate stochastic discount factors and hence asset prices for assets whose dependence with consumption is non-normal. We show that the impact of dependency structure on asset prices is significant.

Keywords

CAPMstochastic discount factorcredit riskcredit spreadcopulaWang transform
Type
Articles
Information
ASTIN Bulletin: The Journal of the IAA , Volume 37 , Issue 1 , May 2007 , pp. 35 - 52
Copyright
Copyright © ASTIN Bulletin 2007

Footnotes

5

Present address: Macquarie Bank, 1 Martin Place, Sydney NSW 2000, Australia.

References

Amato, J.D. and Remolona, E.M. (2003) The Credit Spread Puzzle, Bank of International Settlements Quarterly Review, 5163. http://www.bis.org/publ/qtrpdf/r_qt0312e.pdf.Google Scholar
Black, F. and Scholes, M. (1972) The Valuation of Option Contracts and a Test of Market Efficiency, Journal of Finance 27(2), 397418.CrossRefGoogle Scholar
Black, F. and Scholes, M. (1973) The Pricing of Options and Corporate Liabilities, Journal of Political Economy 81(3), 637654.CrossRefGoogle Scholar
Bühlmann, H. (1980) An Economic Premium Principle, ASTIN Bulletin 11, 5260.CrossRefGoogle Scholar
Cochrane, J.H. (2001) Asset Pricing (Princeton University Press, Princeton, New Jersey).Google Scholar
Demarta, S. and McNeil, A.J. (2004) The t Copula and Related Copulas, Working Paper, Department of Mathematics, ETHZ, www.math.ethz.ch/finance.Google Scholar
Embrechts, P., Lindskog, F. and McNeil, A. (2001) Modelling Dependence with Copulas and Applications to Risk Management, Working Paper, Department of Mathematics, ETHZ, www.math.ethz.ch/finance.Google Scholar
Leland, H.E. (1994) Corporate Debt Value, Bond Covenants, and Optimal Capital Structure, The Journal of Finance XLIX(4), 12131252.CrossRefGoogle Scholar
Leland, H.E. and Bjerre Toft, K. (1996) Optimal Capital Structure, Endogenous Bankruptcy, and the Term Structure of Credit Spreads, The Journal of Finance LI(3), 9871019.CrossRefGoogle Scholar
LeRoy, S.F. and Werner, J. (2001) Principles of Financial Economics (Cambridge University Press, Cambridge, United Kingdom).Google Scholar
Lintner, J. (1965) The Valuation of Risk Assets and the Selection of Risky Investments in Stock Portfolios and Capital Budgets, The Review of Economics and Statistics 47, 1337.CrossRefGoogle Scholar
McLeish, D.L. and Reesor, R.M. (2003) Risk, Entropy and the Transformation of Distributions, North American Actuarial Journal 7(2).Google Scholar
Merton, R.C. (1974) On the Pricing of Corporate Debt: The Risk Structure of Interest Rates, The Journal of Finance 29(2), 449470.Google Scholar
Panjer, H.H. et al. (1998) Financial Economics: with applications to investments, insurance and pensions (The Actuarial Foundation: Schaumburg, Illinois, USA).Google Scholar
Schönbucher, P.J. (2003) Credit Derivatives Pricing Models: Models, Pricing, Implementation (Wiley Finance).Google Scholar
Sharpe, W.F. (1964) Capital Asset Prices: A Theory of Market Equilibrium Under Conditions of Risk, The Journal of Finance XIX(3), 425442.Google Scholar
Venter, G.G. (2001) Tails of Copulas, in Proceedings ASTIN Washington, USA, 68113.Google Scholar
Wang, S.S. (2002) A Universal Framework for Pricing Financial and Insurance Risks, ASTIN Bulletin 32(2), 213234.CrossRefGoogle Scholar
Wang, S.S. (2003) Equilibrium pricing transforms: New results using Bühlmann’s 1980 economic model, ASTIN Bulletin 33, 5773.CrossRefGoogle Scholar