Title :
Pricing of Option with Power Payoff Driven by Mixed Fractional Brownian Motion
Author :
Feng, Xu ; Quan, Sun
Author_Institution :
Bus. Dept., Suzhou Vocational Univ., Suzhou, China
Abstract :
Assuming that the stock price obeys the stochastic differential equation driven by mixed fractional Brownian motion, we establish the mathematical model for the financial market in mixed fractional Brownian motion setting with Hurst parameter greater than 0.5. Under the fractional risk neutral measure, we get the unique equivalent measure by using fractional Girsanov theorem. With quasi-martingale method, we obtain the general pricing formula for the European call option with power payoff, which makes the fractional Brownian motion as an especial case. At same time, we get the explicit expression for the European put option with power payoff and the call-put parity.
Keywords :
Brownian motion; differential equations; pricing; share prices; stochastic processes; stock markets; European call option; Hurst parameter; call-put parity; financial market; fractional Girsanov theorem; fractional risk neutral measure; mixed fractional Brownian motion; option pricing; power payoff; quasi-martingale method; stochastic differential equation; stock price; Brownian motion; Equations; Europe; Mathematical model; Pricing; Stochastic processes; mixed fracional Brownian motion; power option; quasi-martingale;
Conference_Titel :
Business Intelligence and Financial Engineering (BIFE), 2010 Third International Conference on
Conference_Location :
Hong Kong
Print_ISBN :
978-1-4244-7575-9
DOI :
10.1109/BIFE.2010.48
