Option pricing in fractional Heston-type model

Abstract

In this paper, we consider option pricing in a framework of the fractional Heston-type model with H>1/2. As it is impossible to obtain an explicit formula for the expectation E f(ST) in this case, where ST is the asset price at maturity time and f is a payoff function, we provide a discretization schemes Yn and Sn for volatility and price processes correspondingly and study convergence E f( SnT) E f(ST) as the mesh of the partition tends to zero. The rate of convergence is calculated. As we allow f to have discontinuities of the first kind which can cause errors in straightforward Monte-Carlo estimation of the expectation, we use Malliavin calculus techniques to provide an alternative formula for E f(ST) with smooth functional under the expectation.