nach oben

Review of Derivatives Research

Erschienen in:

01.10.2015

A note on the pricing of multivariate contingent claims under a transformed-gamma distribution

verfasst von: Luiz Vitiello, Ivonia Rebelo

Erschienen in: Review of Derivatives Research | Ausgabe 3/2015

Einloggen

Aktivieren Sie unsere intelligente Suche, um passende Fachinhalte oder Patente zu finden.

search-config

KI-gestützte Suche

Aus

Abstract

We develop a framework for pricing multivariate European-style contingent claims in a discrete-time economy based on a multivariate transformed-gamma distribution. In our model, each transformed-gamma distributed underlying asset depends on two terms: a idiosyncratic term and a systematic term, where the latter is the same for all underlying assets and has a direct impact on their correlation structure. Given our distributional assumptions and the existence of a representative agent with a standard utility function, we apply equilibrium arguments and provide sufficient conditions for obtaining preference-free contingent claim pricing equations. We illustrate the applicability of our framework by providing examples of preference-free contingent claim pricing models. Multivariate pricing models are of particular interest when payoffs depend on two or more underlying assets, such as crack and crush spread options, options to exchange one asset for another, and options with a stochastic strike price in general.

Vorheriger Artikel A copula-based approach for generating lattices

Sie haben noch keine Lizenz? Dann Informieren Sie sich jetzt über unsere Produkte:

Springer Professional "Wirtschaft+Technik"

Online-Abonnement

Mit Springer Professional "Wirtschaft+Technik" erhalten Sie Zugriff auf:

über 102.000 Bücher
über 537 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Finance + Banking
Management + Führung
Marketing + Vertrieb
Maschinenbau + Werkstoffe
Versicherung + Risiko

Jetzt Wissensvorsprung sichern!

Jetzt informieren

Springer Professional "Wirtschaft"

Online-Abonnement

Mit Springer Professional "Wirtschaft" erhalten Sie Zugriff auf:

über 67.000 Bücher
über 340 Zeitschriften

aus folgenden Fachgebieten:

Bauwesen + Immobilien
Business IT + Informatik
Finance + Banking
Management + Führung
Marketing + Vertrieb
Versicherung + Risiko

Jetzt Wissensvorsprung sichern!

Jetzt informieren

Nur mit Berechtigung zugänglich

This characteristic is also shared with the multivariate transformed-normal model introduced by Camara (2005).

That is, our model does not require continuous trading.

The gamma distribution contains the normal distribution as a limiting case and, as the lognormal distribution, it lies on a single line in the skewness–kurtosis plane (see Johnson et al. 1994).

Specifically, the forward asset specific pricing kernel in Proposition 1 may not be unique.

The equilibrium relationships in Eqs. (10) and (11) are consistent with a dynamically incomplete market.

The equations presented in the examples can be solved numerically. For a survey of numerical methods for solving this type of equation see Carmona and Durrleman (2003).

The applicability of equations obtained here depends on the estimation of the relevant parameters. Depending on the information available, the method of moments or the methodology suggested by Mathai and Moschopoulos (1991) can be applied, for instance. Alternatively one can use the parameters implied by option market prices (see for instance Mayhew 1995; Poon and Granger 2003).

It is important to note that in an incomplete market setting, such as the one related to flooding, the asset specific pricing kernel in Eq. (9) may not be unique.

Bellini, F., & Mercuri, L. (2014). Option pricing in a conditional bilateral gamma model. Central European Journal of Operations Research, 22, 373–390.CrossRef

Black, F., & Scholes, M. (1973). The pricing of options and corporate liabilities. Journal of Political Economy, 81, 637–654.CrossRef

Brennan, M. (1979). The pricing of contingent claims in discrete time models. Journal of Finance, 34, 53–68.CrossRef

Camara, A. (2005). Option prices sustained by risk-preferences. Journal of Business, 78, 1683–1708.CrossRef

Carmona, R., & Durrleman, V. (2003). Pricing and hedging spread options. Siam Review, 45, 627–685.CrossRef

Gerber, H., & Shiu, E. (1994). Option pricing by Esscher transforms. Transactions of Society of Actuaries, 46, 99–140.

Griffiths, G. (1990). Rainfall deficits: Distribution of monthly runs. Journal of Hydrology, 115, 219–229.CrossRef

Heston, S. (1993). Invisible parameters in option prices. Journal of Finance, 48, 933–947.CrossRef

Johnson, H. (1987). Options on the maximum of the minimum of several assets. Journal of Financial and Quantitative Analysis, 22, 277–283.CrossRef

Johnson, N. L., Kotz, S., & Balakrishnan, N. (1994). Continuous univariate distributions (Vol. 1). New York: Wiley.

Kotz, S., Balakrishnan, N., & Johnson, N. L. (2000). Continuous multivariate distributions (Vol. 1). New York: Wiley.CrossRef

Lane, M., & Movchan, O. (1999). The perfume of a premium II. Derivatives Quarterly, 5, 27–40.

Leobacher, G., & Ngare, P. (2011). On modelling and pricing rainfall derivatives with seasonality. Applied Mathematical Finance, 18, 71–91.CrossRef

Madan, D. B., & Seneta, E. (1990). The variance gamma (V.G.) model for share market returns. Journal of Business, 63, 511–524.CrossRef

Madan, D. B., Carr, P., & Chang, E. (1998). The variance gamma process and option pricing. European Finance Review, 2, 79–105.CrossRef

Margrabe, W. (1978). The value of an option to exchange one asset for another. Journal of Finance, 33, 177–186.CrossRef

Mathai, A. M., & Moschopoulos, P. G. (1991). On a multivariate gamma. Journal of Multivariate Analysis, 39, 135–153.CrossRef

Mayhew, S. (1995). Implied volatility. Financial Analysts Journal, 51, 8–20.

Poon, S., & Granger, C. (2003). Forecasting volatility in financial markets: A review. Journal of Economic Literature, 41, 478–539.CrossRef

Salem, A. B., & Mount, T. D. (1974). A convenient descriptive model for income distribution: The gamma density. Econometrica, 42, 1115–1128.CrossRef

Savickas, R. (2002). A simple option pricing formula. Financial Review, 37, 207–226.CrossRef

Schroder, M. (2004). Risk-neutral parameters shifts and derivatives pricing in discrete time. Journal of Finance, 59, 2375–2401.CrossRef

Simpson, J. (1972). Use of gamma distribution in single-cloud rainfall analysis. Monthly Weather Review, 100, 309–312.CrossRef

Stapleton, R. C., & Subrahmanyam, M. G. (1984). The valuation of multivariate contingent claims in discrete time models. Journal of Finance, 39, 207–228.CrossRef

Stulz, R. (1982). Options on the minimum or the maximum of two risky assets: analysis and applications. Journal of Financial Economics, 10, 161–185.CrossRef

Vitiello, L., & Poon, S. (2010). General equilibrium and preference free model for pricing options under transformed Gamma. Journal of Futures Markets, 30, 409–431.

Zhou, Z. (1998). An equilibrium analysis of hedging with liquidity constraints, speculation, and government price subsidy in a commodity market. Journal of Finance, 53, 1705–1736.CrossRef

Titel: A note on the pricing of multivariate contingent claims under a transformed-gamma distribution
verfasst von: Luiz Vitiello
Ivonia Rebelo
Publikationsdatum: 01.10.2015
Verlag: Springer US
Erschienen in: Review of Derivatives Research / Ausgabe 3/2015
Print ISSN: 1380-6645
Elektronische ISSN: 1573-7144
DOI: https://doi.org/10.1007/s11147-015-9112-9