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http://dx.doi.org/10.7468/jksmeb.2014.21.4.295

OPTION PRICING UNDER STOCHASTIC VOLATILITY MODEL WITH JUMPS IN BOTH THE STOCK PRICE AND THE VARIANCE PROCESSES  

Kim, Ju Hong (Department of Mathematics, Sungshin Women's University)
Publication Information
The Pure and Applied Mathematics / v.21, no.4, 2014 , pp. 295-305 More about this Journal
Abstract
Yan & Hanson [8] and Makate & Sattayatham [6] extended Bates' model to the stochastic volatility model with jumps in both the stock price and the variance processes. As the solution processes of finding the characteristic function, they sought such a function f satisfying $$f({\ell},{\nu},t;k,T)=exp\;(g({\tau})+{\nu}h({\tau})+ix{\ell})$$. We add the term of order ${\nu}^{1/2}$ to the exponent in the above equation and seek the explicit solution of f.
Keywords
stochastic-volatility; jump-diffusion; risk-neutral option pricing; characteristic function;
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  • Reference
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