Option pricing and hedging under a stochastic volatility Lévy process model

Review of Derivatives Research, Volume 15, pages 81–97, (2012) In this paper, we discuss a stochastic volatility model with a Lévy driving process and then apply the model to option pricing and hedging. The stochastic volatility in our model is defined by the continuous Markov chain. The risk-neutral measu...

Author(s)

Frank J. Fabozzi, Young Shin Kim, Zuodong Lin, Svetlozar T. Rachev

Review of Derivatives Research, Volume 15, pages 81–97, (2012)

In this paper, we discuss a stochastic volatility model with a Lévy driving process and then apply the model to option pricing and hedging. The stochastic volatility in our model is defined by the continuous Markov chain. The risk-neutral measure is obtained by applying the Esscher transform. The option price using this model is computed by the Fourier transform method. We obtain the closed-form solution for the hedge ratio by applying locally risk-minimizing hedging.