[Bakshi, G., Cao, C. and Chen, Z. (1997). Empirical performance of alternative option pricing models, The Journal of FinanceLII(5): 2003-2049.10.1111/j.1540-6261.1997.tb02749.x]Search in Google Scholar
[Bardossy, A. and Duckstein, L. (1995). Fuzzy Rule-Based Modelingwith Applications to Geophysical, Biological andEngineering Systems (Systems Engineering), CRC Press, Boca Raton, FL.]Search in Google Scholar
[Barndorff-Nielsen, O.E. (1998). Processes of normal inverse Gaussian type, Finance and Stochastics 2(1): 41-68.10.1007/s007800050032]Search in Google Scholar
[Bates, D. (1996). Jumps and stochastic volatility: Exchange rate processes implicit in deutschemark options, The Review ofFinancial Studies 9(1): 69-107.10.1093/rfs/9.1.69]Search in Google Scholar
[Black, F. and Scholes, M. (1973). The pricing of options and corporate liabilities, Journal of Political Economy81(3): 637-659.10.1086/260062]Search in Google Scholar
[Brigo, D., Pallavicini, A. and Torresetti, R. (2007). Credit derivatives: Calibration of CDO tranches with the dynamical GPL model, Risk Magazine 20(5): 70-75.10.2139/ssrn.900549]Search in Google Scholar
[Davis, M. (2001). Mathematics of financial markets, in B. Engquist and W. Schmid (Eds.), MathematicsUnlimited-2001 & Beyond, Springer, Berlin, pp. 361-380.10.1007/978-3-642-56478-9_16]Search in Google Scholar
[Dubois, D. and Prade, H. (1980). Fuzzy Sets and Systems-Theory and Applications, Academic Press, New York, NY.]Search in Google Scholar
[El Karoui, N. and Rouge, R. (2000). Pricing via utility maximization and entropy, Mathematical Finance10(2): 259-276.10.1111/1467-9965.00093]Search in Google Scholar
[Frittelli, M. (2000). The minimal entropy martingale measure and the valuation problem in incomplete markets, MathematicalFinance 10(1): 39-52.10.1111/1467-9965.00079]Search in Google Scholar
[Fujiwara, T. and Miyahara, Y. (2003). The minimal entropy martingale measures for geometric Levy processes, Financeand Stochastics 7(1): 509-531.10.1007/s007800200097]Search in Google Scholar
[Glasserman, P. (2004). Monte Carlo Methods in Financial Engineering, Springer-Verlag, New York, NY.10.1007/978-0-387-21617-1]Search in Google Scholar
[Hull, J.C. (1997). Options, Futures and Other Derivatives, Prentice Hall, Upper Saddle River, NJ.]Search in Google Scholar
[Jacod, J. and Shiryaev, A. (1987). Limit Theorems for StochasticProcesses, Springer-Verlag, Berlin/Heidelberg/New York, NY.10.1007/978-3-662-02514-7]Search in Google Scholar
[Kou, S.G. (2002). A jump-diffusion model for option pricing, Management Science 48(8): 1086-1101.10.1287/mnsc.48.8.1086.166]Search in Google Scholar
[Kou, S.G. and Wang, H. (2004). Option pricing under a double exponential jump diffusion model, Management Science50(9): 1178-1192. 10.1287/mnsc.1030.0163]Search in Google Scholar
[Li, C. and Chiang, T.-W. (2012). Intelligent financial time series forecasting: A complex neuro-fuzzy approach with multi-swarm intelligence, International Journal of AppliedMathematics and Computer Science 22(4): 787-800, DOI: 10.2478/v10006-012-0058-x.10.2478/v10006-012-0058-x]Search in Google Scholar
[Madan, D.B. and Seneta, E. (1990). The variance gamma (v.g.) model for share market returns, The Journal of Business63(4): 511-524.]Search in Google Scholar
[Merton, R. (1976). Option pricing when underlying stock returns are discontinuous, Journal of Financial Economics3(1): 125-144.10.1016/0304-405X(76)90022-2]Search in Google Scholar
[Miyahara, Y. (2004). A note on Esscher transformed martingale measures for geometric Levy processes, Discussion Papersin Economics, No. 379, Nagoya City University, Nagoya, pp. 1-14.]Search in Google Scholar
[Nowak, P. (2011). Option pricing with Levy process in a fuzzy framework, in K.T. Atanassov, W. Homenda, O.Hryniewicz, J. Kacprzyk, M. Krawczak, Z. Nahorski, E. Szmidt and S. Zadrożny (Eds.), Recent Advances in FuzzySets, Intuitionistic Fuzzy Sets, Generalized Nets and RelatedTopics, Polish Academy of Sciences, Warsaw, pp. 155-167.]Search in Google Scholar
[Nowak, P., Nycz, P. and Romaniuk, M. (2002). On selection of the optimal stochastic model in the option pricing via Monte Carlo methods, in J. Kacprzyk and J. Węglarz (Eds.), Modelling and Optimization-Methods and Applications, Exit, Warsaw, pp. 59-70, (in Polish).]Search in Google Scholar
[Nowak, P. and Romaniuk, M. (2010). Computing option price for Levy process with fuzzy parameters, European Journalof Operational Research 201(1): 206-210.10.1016/j.ejor.2009.02.009]Search in Google Scholar
[Shiryaev, A.N. (1999). Essential of Stochastic Finance, World Scientific Publishing, Singapore.10.1142/3907]Search in Google Scholar
[Ssebugenyi, C.S. (2011). Using the minimal entropy martingale measure to valuate real options in multinomial lattices, AppliedMathematical Sciences 67(5): 3319-3334.]Search in Google Scholar
[Wu, H.-C. (2004). Pricing European options based on the fuzzy pattern of Black-Scholes formula, Computers & OperationsResearch 31(7): 1069-1081.10.1016/S0305-0548(03)00065-0]Search in Google Scholar
[Wu, H.-C. (2007). Using fuzzy sets theory and Black-Scholes formula to generate pricing boundaries of European options, Applied Mathematics and Computation185(1): 136-146. 10.1016/j.amc.2006.07.015]Search in Google Scholar
[Xu, W.D., Wu, C.F. and Li, H.Y. (2011). Foreign equity option pricing under stochastic volatility model with double jumps, Economic Modeling 28(4): 1857-1863.10.1016/j.econmod.2011.03.016]Search in Google Scholar
[Yoshida, Y. (2003). The valuation of European options in uncertain environment, European Journal of OperationalResearch 145(1): 221-229.10.1016/S0377-2217(02)00209-6]Search in Google Scholar
[Zadeh, L.A. (1965). Fuzzy sets, Information and Control8(47): 338-353.10.1016/S0019-9958(65)90241-X]Search in Google Scholar
[Zhang, L.-H., Zhang, W.-G., Xu, W.-J. and Xiao, W.-L. (2012). The double exponential jump diffusion model for pricing European options under fuzzy environments, EconomicModelling 29(3): 780-786.10.1016/j.econmod.2012.02.005]Search in Google Scholar
[Zhou, C. (2002). Fuzzy-arithmetic-based Lyapunov synthesis in the design of stable fuzzy controllers: A computing-with-words approach, International Journalof Applied Mathematics and Computer Science12(3): 411-421. ]Search in Google Scholar