References
- Augustyniak, M. and Badescu, A., On the computation of hedging strategies in affine GARCH models. J. Futures Mark., 2020.
- Augustyniak, M., Godin, F. and Simard, C., Assessing the effectiveness of local and global quadratic hedging under GARCH models. Quant. Finance, 2017, 17(9), 1305–1318. doi: 10.1080/14697688.2017.1279342
- Babaoğlu, K., Christoffersen, P., Heston, S. and Jacobs, K., Option valuation with volatility components, fat tails, and nonmonotonic pricing kernels. Rev. Asset Pricing Stud., 2018, 8(2), 183–231. doi: 10.1093/rapstu/rax021
- Badescu, A., Elliott, R.J. and Ortega, J.-P., Quadratic hedging schemes for non-Gaussian GARCH models. J. Econ. Dyn. Control, 2014, 42, 13–32. doi: 10.1016/j.jedc.2014.03.001
- Badescu, A., Cui, Z. and Ortega, J.-P., Non-affine GARCH option pricing models, variance-dependent kernels, and diffusion limits. J. Financ. Econom., 2017, 15(4), 602–648. doi: 10.1093/jjfinec/nbx022
- Ben-Ameur, H., Breton, M. and Martinez, J.-M., Dynamic programming approach for valuing options in the GARCH model. Manage. Sci., 2009, 55(2), 252–266. doi: 10.1287/mnsc.1080.0925
- Breton, M. and Frutos, J. d., Option pricing under GARCH processes using PDE methods. Oper. Res., 2010, 58(4-part-2), 1148–1157. doi: 10.1287/opre.1100.0822
- Cakici, N. and Topyan, K., The GARCH option pricing model: A lattice approach. J. Comput. Finance, 2000, 3(4), 71–85. doi: 10.21314/JCF.2000.049
- Chen, C.-C. and Hung, M.-Y., Option pricing under Markov-switching GARCH processes. J. Futures Markets, 2010, 30(5), 444–464.
- Chorro, C., Guégan, D. and Ielpo, F., Option pricing for GARCH-type models with generalized hyperbolic innovations. Quant. Finance, 2012, 12(7), 1079–1094. doi: 10.1080/14697688.2010.493180
- Christoffersen, P. and Jacobs, K., Which GARCH model for option valuation? Manage. Sci., 2004, 50, 1204–1221. doi: 10.1287/mnsc.1040.0276
- Christoffersen, P., Heston, S. and Jacobs, K., Option valuation with conditional skewness. J. Econom., 2006, 131(1-2), 253–284. doi: 10.1016/j.jeconom.2005.01.010
- Christoffersen, P., Jacobs, K., Ornthanalai, C. and Wang, Y., Option valuation with long-run and short-run volatility components. J. Financ. Econ., 2008, 90(3), 272–297. doi: 10.1016/j.jfineco.2007.12.003
- Christoffersen, P., Dorion, C., Jacobs, K. and Wang, Y., Volatility components, affine restrictions, and nonnormal innovations. J. Bus. Econ. Stat., 2010, 28(4), 483–502. doi: 10.1198/jbes.2009.06122
- Duan, J.-C., The GARCH option pricing model. Math. Finance, 1995, 5(1), 13–32. doi: 10.1111/j.1467-9965.1995.tb00099.x
- Duan, J.-C. and Simonato, J.-G., American option pricing under GARCH by a Markov chain approximation. J. Econ. Dyn. Control, 2001, 25(11), 1689–1718. doi: 10.1016/S0165-1889(00)00003-8
- Duan, J.-C., Gauthier, G. and Simonato, J.-G., An analytical approximation for the GARCH option pricing model. J. Comput. Finance, 1999, 2(4), 75–116. doi: 10.21314/JCF.1999.033
- Duan, J.-C., Gauthier, G., Simonato, J.-G. and Sasseville, C., Approximating the GJR-GARCH and EGARCH option pricing models analytically. J. Comput. Finance, 2006, 9, 41–69. doi: 10.21314/JCF.2006.156
- Engle, R.F. and Ng, V.K., Measuring and testing the impact of news on volatility. J. Finance, 1993, 48(5), 1749–1778. doi: 10.1111/j.1540-6261.1993.tb05127.x
- Föllmer, H. and Schied, A., Stochastic Finance, volume 27 of De Gruyter Studies in Mathematics, extended edition. An introduction in discrete time, 2004 (Walter de Gruyter & Co.: Berlin).
- Föllmer, H. and Schweizer, M., Hedging by sequential regression: An introduction to the mathematics of option trading. Astin Bull., 1989, 18(2), 147–160. doi: 10.2143/AST.18.2.2014948
- Garcia, R. and Renault, É., A note on hedging in ARCH and stochastic volatility option pricing models. Math. Finance, 1998, 8(2), 153–161. doi: 10.1111/1467-9965.00049
- Heston, S.L. and Nandi, S., A closed-form GARCH option valuation model. Rev. Financ. Stud., 2000, 13(3), 585–625. doi: 10.1093/rfs/13.3.585
- Huang, S.-F. and Guo, M., Dynamic programming and hedging strategies in discrete time. In Handbook of Computational Finance, edited by JC. Duan, W. Härdle, and J. Gentle, pp. 605–631, 2012 (Springer: Berlin). https://doi.org/10.1007/978-3-642-17254-0_22
- Kanniainen, J., Lin, B. and Yang, H., Estimating and using GARCH models with VIX data for option valuation. J. Bank. Finance, 2014, 43, 200–211. doi: 10.1016/j.jbankfin.2014.03.035
- Lamberton, D., Pham, H. and Schweizer, M., Local risk-minimization under transaction costs. Math. Oper. Res., 1998, 23(3), 585–612. doi: 10.1287/moor.23.3.585
- Lin, B.-H., Hung, M.-W., Wang, J.-Y. and Wu, P.-D., A lattice model for option pricing under GARCH-jump processes. Rev. Deriv. Res., 2013, 16(3), 295–329. doi: 10.1007/s11147-012-9087-8
- Lyuu, Y.-D. and Wu, C.-N., On accurate and provably efficient GARCH option pricing algorithms. Quant. Finance, 2005, 5(2), 181–198. doi: 10.1080/14697680500040157
- Ortega, J.-P., GARCH options via local risk minimization. Quant. Finance, 2012, 12(7), 1095–1110. doi: 10.1080/14697688.2010.494164
- Rémillard, B. and Rubenthaler, S., Optimal hedging in discrete time. Quant. Finance, 2013, 13(6), 819–825. doi: 10.1080/14697688.2012.745012
- Ritchken, P. and Trevor, R., Pricing options under generalized GARCH and stochastic volatility processes. J. Finance, 1999, 54(1), 377–402. doi: 10.1111/0022-1082.00109
- Schweizer, M., Hedging of options in a general semimartingale model. PhD thesis, ETH Zürich, Zürich, 1988.
- Schweizer, M., Option hedging for semimartingales. Stoch. Process. Appl., 1991, 37(2), 339–363. doi: 10.1016/0304-4149(91)90053-F
- Schweizer, M., Variance-optimal hedging in discrete time. Math. Oper. Res., 1995, 20(1), 1–32. doi: 10.1287/moor.20.1.1
- Schweizer, M., A guided tour through quadratic hedging approaches. In Handbooks in Mathematical Finance: Option Pricing, Interest Rates And Risk Management, pp. 538–574, 2001 (Cambridge University Press: Cambridge).
- Simonato, J.-G., American option pricing under GARCH with non-normal innovations. Optim. Eng., 2019, 20, 853–880. https://doi.org/10.1007/s11081-019-09421-w.