Feynman path integrals and asymptotic expansions for transition probability densities of some Lévy driven financial markets.

Autor: Issaka, Aziz, SenGupta, Indranil
Zdroj: Journal of Applied Mathematics & Computing; Jun2017, Vol. 54 Issue 1/2, p159-182, 24p
Abstrakt: In this paper we implement the method of Feynman path integral for the analysis of option pricing for certain Lévy process driven financial markets. For such markets, we find closed form solutions of transition probability density functions of option pricing in terms of various special functions. Asymptotic analysis of transition probability density functions is provided. We also find expressions for transition probability density functions in terms of various special functions for certain Lévy process driven market where the interest rate is stochastic. [ABSTRACT FROM AUTHOR]
Databáze: Complementary Index