Pricing Geometric Asian Options under Mixed Fractional Brownian Motion Environment with Superimposed Jumps

Abstract

It has been observed that the stock price process can be modelled with driving force as a mixed fractional Brownian motion (mfBm) with Hurst index $H > 3 / 4$ whenever long-range dependence is possibly present. We propose a geometric mfBm model for the stock price process with possible jumps superimposed by an independent Poisson process.

Keywords

Mixed fractional Brownian motion Option price Asian option Poisson process superimposed jumps

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