References
- Achdou, Y., & Pironneau, O. (2005). Computational methods for option pricing. Philadelphia, PA: SIAM Press.
- Aihara, S., Bagchi, A., & Saha, S. (2009). On parameter estimation of stochastic volatility models from stock data using particle filter – application to AEX index. International Journal of Innovative Computing, Information and Control, 5(1), 17–27.
- Aït-Sahalia, Y. (1999). Transition densities for interest rate and other nonlinear diffusions. The Journal of Finance, 54(4), 1361–1395. doi:10.1111/0022-1082.00149
- Aït-Sahalia, Y., Karaman, M., & Mancini, L. (2011, May) Variance swap, risk premiums, and expectation hypothesis. Princeton-Laussane Conference. Retrieved from http://ssrn.com/abstract=2136820
- Aït-Sahalia, Y., & Kimmel, R. (2007). Maximum likelihood estimation of stochastic volatility models. Journal of Financial Economics, 83, 413–452. doi:10.1016/j.jfineco.2005.10.006
- Albrecher, H., Mayer, P., Schoutens, W., & Tistaert, J. (2007). The Little Heston Trap. Wilmott Magazine, pp. 83–92.
- Bakshi, G., Cao, C., & Chen, Z. (1997). Empirical performance of alternative option pricing models. The Journal of Finance, 52(5), 2003–2049. doi:10.1111/j.1540-6261.1997.tb02749.x
- Bjork, T. (2000). Arbitrage theory in continuous time (2nd ed.). Oxford: Oxford University Press.
- Carr, P., & Lee, R. (2009). Robust replication of volatility derivatives. MFA 2008 Annual Meeting, PRMIA Award for Best Paper in Derivatives.
- Carr, P., & Madan, D. (1999). Option Valuation and the Fast Fourier Transform. Journal of Computational Finance, 2(4), 61–73.
- Carr, P., & Wu, L. (2009). Variance risk premiums. The Review of Financial Studies, 22, 1311–1341. doi:10.1093/rfs/hhn038
- Christoffersen, P., Heston, S., & Jacobs, K. (2009). The shape and term structure of the index option smirk: Why multi-factor stochastic volatility models work so well. Management Science, 55, 1914–1932. doi:10.1287/mnsc.1090.1065
- Christoffersen, P., Jacobs, K., & Mimouni, K. (2007). Volatility dynamics for the S&P500: Evidence from realized volatility, daily returns and option prices. EFA 2007 Ljubljana Meetings Paper; AFA 2008 New Orleans Meetings Paper. Retrieved from http://ssrn.com/abstract=926373
- Cont, R., & Tankov, P. (2006). Retrieving Lévy processes from option prices: Regularization of an ill-posed inverse problem. SIAM Journal on Control and Optimization, 45(1), 1–25. doi:10.1137/040616267
- Cvitanić, J., Liptser, R., & Rozovskii, B. (2006). A filtering approach to tracking volatility from prices observed at random times. The Annals of Applied Probability, 16, 1633–1652. doi:10.1214/105051606000000222
- Demeterfi, K., Derman, E., Kamal, M., & Zou, J. (1999). A guide to volatility and variance swaps. The Journal of Derivatives, 6(4), 9–32. doi:10.3905/jod.1999.319129
- Desai, R., Lele, T., & Viens, F. (2003). A Monte-Carlo method for portfolio optimization under partially observed stochastic volatility. 2003 IEEE International Conference on Computational Intelligence for Financial Engineering, 257–263.
- Drǎgulescu, A., & Yakovenko, V. (2002). Probability distribution of returns in the Heston model with stochastic volatility. Quantitative Finance, 2, 443–453. doi:10.1080/14697688.2002.0000011
- Eraker, B. (2004). Do stock prices and volatility jump? Reconciling evidence from spot and option prices. The Journal of Finance, 59(3), 1367–1404. doi:10.1111/j.1540-6261.2004.00666.x
- Figlewski, S. (2008). Estimating the implied risk neutral density for the U.S. market portfolio. In T. Bollerslev, J. R. Russell, and M. Watson (Eds.), Volatility and Time Series Analysis: Essays in Honor of Robert F. Engle. Oxford: Oxford University Press.
- Fouque, J., Papanicolaou, G., Sircar, R., & Solna K. (2004). Maturity cycles in implied volatility. Finance and Stochastics, 8, 451–477. doi:10.1007/s00780-004-0126-7
- Fouque, J. P., Papanicolaou, G., Sircar, R., & Solna, K. (2011). Multiscale stochastic volatility for equity, interest rate, and credit derivatives. New York, NY: Cambridge University Press.
- Friz, P., & Gatheral, J. (2005). Valuation of volatility derivatives as an inverse problem. Quantitative Finance, 5(6), 531–542. doi:10.1080/14697680500362452
- Heston, S. (1993). A closed-form solution for options with stochastic volatility with applications to bond and currency options. The Review of Financial Studies, 6(2), 327–343. doi:10.1093/rfs/6.2.327
- Hoerl, A. E., & Kennard, R. W. (1970). Ridge regression: Biased estimation for nonorthogonal problems. Technometrics, 12(1), 55–67. doi:10.1080/00401706.1970.10488634
- Lewis, A. L. (2000). Option valuation under stochastic volatility with mathematica code. Newport Beach, CA: Finance Press.
- Renault, E., & Touzi, N. (1996). Option hedging and implied volatilities in a stochastic volatility model. Mathematical Finance, 6(3), 279–302. doi:10.1111/j.1467-9965.1996.tb00117.x
- Todorov, V. (2010). Variance risk premium dynamics: The role of jumps. Review of Financial Studies, 23(1), 345–383. doi:10.1093/rfs/hhp035