A NUMERICAL ANALYSIS OF THE EXTENDED BLACK-SCHOLES MODEL

In this article some numerical results regarding the multidimensional extension of the Black-Scholes model introduced by Albeverio and Steblovskaya [1] ( a multidimensional model with stochastic volatilities and correlations) are presented. The focus lies on aspects concerning the use of this model for the practice of financial derivatives. Two parameter estimation methods for the model using historical data from the market and an analysis of the corresponding numerical results are given. Practical advantages of pricing derivatives using this model compared to the original multidimensional BlackScholes model are pointed out. In particular the prices of vanilla options and of implied volatility surfaces computed in the model are close to those observed on the market.