A Jump-Diffusion Model for Option Pricing

S. G. Kou

Published Online:1 Aug 2002https://doi.org/10.1287/mnsc.48.8.1086.166

Abstract

Brownian motion and normal distribution have been widely used in the Black–Scholes option-pricing framework to model the return of assets. However, two puzzles emerge from many empirical investigations: the leptokurtic feature that the return distribution of assets may have a higher peak and two (asymmetric) heavier tails than those of the normal distribution, and an empirical phenomenon called “volatility smile” in option markets. To incorporate both of them and to strike a balance between reality and tractability, this paper proposes, for the purpose of option pricing, a double exponential jump-diffusion model. In particular, the model is simple enough to produce analytical solutions for a variety of option-pricing problems, including call and put options, interest rate derivatives, and path-dependent options. Equilibrium analysis and a psychological interpretation of the model are also presented.

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Volume 48, Issue 8
August 2002
Pages 955-1101
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- Received:November 29, 2001
- Published Online:August 01, 2002
© 2002 INFORMS
https://doi.org/10.1287/mnsc.48.8.1086.166
Title:A Jump-Diffusion Model for Option Pricing
Authors:
- S. G. Kou
S. G. Kou
Publication:Management Science
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A Jump-Diffusion Model for Option Pricing

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Volume 48, Issue 8

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