NUMERICAL APPROXIMATION OF BLACK SCHOLES STOCHASTIC DIFFERENTIAL EQUATION USING EULER-MARUYAMA AND MILSTEIN METHODS
DOI:
https://doi.org/10.4314/jfas.v13i1.13Keywords:
Stochastic differential equations, Euler-Maruyama method, Milstein method, Black-Scholes equation, Call optionAbstract
This paper will introduce the Ito’s lemma used in the stochastic calculus to obtain the Ito-Taylor expansion of a stochastic differential equations. The Euler-Maruyama and Milstein’s methods of solving stochastic differential equations will be discussed and derived. We will apply these two numerical methods to the Black-Scholes model to obtain the values of a European call option of a stock at discretized time intervals. We will use a computer simulation to approximate while using the Ito’s formula to obtain the exact solution. The numerical approximations to the exact solution to infer on the effectiveness of the two methods.
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References
[1] Bayram, M., Partal, T., & Orucova Buyukoz, G. Numerical methods for simulation of stochastic differential equations. Advances in Differences Equations, 2018 17 (2018). https://doi.org/10.1186/s13662-018-1466-5
[2] Dunbar, S.R. Stochastic Processes and Advanced Mathematical Finance: Solution of the Black Scholes Equation. 2016. http://www.math.unl.edu/~sdunbar1/MathematicalFinance/Lessons/BlackScholes/Solution/solution.pdf
[3] Erfanian, H.R., Hajimohammadi, M., Abdi, M.J. Using the Euler-Maruyama method for
Finding a Solution to Stochastic Financial problems. International Journal of Intelligent Systems and Applications, 2016(6), 48-55. https://doi.10.5815/ijisa.2016.06.06
[4] Kloeden, P.E., Platen, E. Numerical Solution of Stochastic Differential Equations. Springer-Verlag, Berlin, 1992, pp.181-184
[5] Sauer, T. Numerical Analysis, 2nd edition. Pearson Education Inc., Boston, 2012, pp.452-466
[6] Tabar, M.R.R. Analysis and Data-Based Reconstruction of Complex Nonlinear Dynamical Systems, Understanding Complex Systems. Springer Nature, Switzerland AG, 2019, pp.129-134.
[2] Dunbar, S.R. Stochastic Processes and Advanced Mathematical Finance: Solution of the Black Scholes Equation. 2016. http://www.math.unl.edu/~sdunbar1/MathematicalFinance/Lessons/BlackScholes/Solution/solution.pdf
[3] Erfanian, H.R., Hajimohammadi, M., Abdi, M.J. Using the Euler-Maruyama method for
Finding a Solution to Stochastic Financial problems. International Journal of Intelligent Systems and Applications, 2016(6), 48-55. https://doi.10.5815/ijisa.2016.06.06
[4] Kloeden, P.E., Platen, E. Numerical Solution of Stochastic Differential Equations. Springer-Verlag, Berlin, 1992, pp.181-184
[5] Sauer, T. Numerical Analysis, 2nd edition. Pearson Education Inc., Boston, 2012, pp.452-466
[6] Tabar, M.R.R. Analysis and Data-Based Reconstruction of Complex Nonlinear Dynamical Systems, Understanding Complex Systems. Springer Nature, Switzerland AG, 2019, pp.129-134.
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Published
2020-10-10
How to Cite
NWACHUKWU, O. O. NUMERICAL APPROXIMATION OF BLACK SCHOLES STOCHASTIC DIFFERENTIAL EQUATION USING EULER-MARUYAMA AND MILSTEIN METHODS. Journal of Fundamental and Applied Sciences, [S. l.], v. 13, n. 1, p. 225–242, 2020. DOI: 10.4314/jfas.v13i1.13. Disponível em: https://jfas.info/index.php/JFAS/article/view/930. Acesso em: 30 jan. 2025.
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