H∈(23,1)
References
- Alòs, E., O. Mazet, and D. Nualart. 2000. Stochastic calculus with respect to fractional Brownian motion with Hurst parameter less than 1/2. Stochastic Processes and Their Applications 86:121–39.
- Androshchuk, T. O. 2006. Approximation of a stochastic integral with respect to fractional Brownian motion by integrals with respect to absolutely continuous processes. Theory of Probability and Mathematical Statistics 73:19–29.
- Chronopoulou, A., and F. G. Viens. 2012. Estimation and pricing under long-memory stochastic volatility. Annals of Finance 8:379–403.
- Comte, F., and E. Renault. 1998. Long memory in continuous-time stochastic volatility models. Mathematical Finance 8:291–323.
- Cont, R. 2005. Long range dependence in financial markets. In Fractal in Engineering: New Trends in theory and applications, ed. J. Levy-Velel and E. Lutton, 159–79. London, UK: Springer.
- Corduneanu, C. 1977. Principles of Differential and Integral equations. Chelsea Publishing Series. https://books.google.com/books?id=CzZPAQAAIAAJ
- Cox, J. C., J. E. Ingersoll, and S. A. Ross. 1985. A theory of term structure of interest rates. Econometrica 53:385–407
- Duncan, T. E., Y. Hu, and B. Pasik Duncan. 2000. Stochastic calculus for fractional Brownian motion. SIAM Control and Optimization 38:582–612.
- Feyel, D., and A. De la Pradelle. 1999. On fractional Brownian processes. Potential Analysis 10:273–288.
- Geman H., and M. Yor. 1996. Pricing and hedging double barrier options: A probabilistic approach. Mathematical finance 6 (4):365–78.
- Higham, D. J. 2001. An algorithmic introduction to numerical simulation of stochastic dierential equations. SIAM. Review 43 (3):525–46.
- Higham, D. J., X. Mao, and A. M. Stuart. 2002. Strong convergence of euler type methods for nonlinear stochastic dierential equations, SIAM Journal on Numerical Analysis Vol. 40, No.3, 1041–63.
- Hu, Y., and B. Øksendal. 2003. Fractional white noise calculus and applications to Finance. Infinite Dimensional Analysis, Quantum Probability 6:1–32.
- Hui, H. C., C. F. Lo, and P. H. Yuen. 1997. Comment on “pricing double-barrier options using Laplace transforms”. Finance and Stochastics 4:105–7.
- Kabanov, Y. M., and M. M. Safarian. 1997. On Leland’s strategy of option pricing with transactions costs. Finance and Stochastic 1:239–50.
- Kunitomo, N., and M. Ikeda. 1992. Pricing options with curved boundaries. Mathematical Finance 4:275–98.
- Leland, H. E. 1985. Option pricing and replication with transactions costs, The Journal of Finance, 40:1283–1301.
- Lepinette, E., and F. Mehrdoust. 2017. A fractional version of the Heston model with Hurst parameter H∈(12,1) . Dynamic Systems and Application 26:535–48.
- Liu, H. K., and J. J. Chang. 2013. A closed-form approximation for the fractional Black⣠Scholes model with transaction costs. Computers and Mathematics with Applications 65:1719–26.
- Mandebrot, B. B., and J. W. Van Ness. 1968. Fractional Brownian motions, fractional noises and applications. SIAM Review 10:422–37.
- Najafi, A. R., F. Mehrdoust, and Sh. Shrinpour. 2017. Pricing American put option on zero-coupon Bond under fractional CIR model with transaction cost. Communication in Statistics- Simulation and Computation 47 (3):864–70.
- Oksendal, B. 1998. Stochastic differential equation. London, UK: Springer-Verlag.
- Pelsser, A. 2000. Pricing double barrier options using analytical inversion of Laplace transforms. Finance and Stochastics 4:95–104.
- Rogers, L. C. G. 1997. Arbitrage with fractional Brownian motion. Mathematical Finance 7 (1):95–105.
- Rogers, L. C. G., and O. Zane. 1995. Valuing moving barrier options. Computational Finance 1:5–12.
- Rostek, S. 2009. Option pricing in fractional Brownian markets. Germany: Springer.
- Salopek, D. M. 1998. Tolerance to arbitrage. Stochastic Processes and their Application 76:217–30.
- Schroder, M. 2000. On the valuation of double-barrier options: Computational aspects. Journal of Computational Finance 5:5–33.
- Shiryaev, A. N. 1998. On arbitrage and replication for fractal models. Research Report 20, Ma-PhySto, Department of Mathematical Sciences, University of Arhus, Denmark.
- Thao, T. H. 2006. An approximate approach to fractional analysis for finance. Nonlinear Analysis 7:124–32.
- Wang, X. T., M. Wu, Z. M. Zhou, and W. S. Jing. 2012. Pricing European option with transaction costs under the fractional long memory stochastic volatility model. Physica A 391:1469–80