Numerical Spline Method for Simulation of Stochastic Differential Equations systems
DOI:
https://doi.org/10.26389/AJSRP.L030621Keywords:
systems of stochastic differential equations, Multi-Wiener Process, Spline Collocation Polynomial, Mean-Square Stability, Mean-Square ConvergenceAbstract
In this paper, numerical spline method is presented with collocation two parameters for solving systems of multi-dimensional stochastic differential equations (SDEs). Multi-Wiener's time-continuous process is simulated as a discrete process, and then the mean-square stability of proposed method when applied to a system of two-dimensional linear SDEs is studied. The study shows that the method is mean-square stability and third-order convergent when applied to a system of linear and nonlinear SDEs. Moreover, the effectiveness of our method was tested by solving two test linear and non-linear problems. The numerical results show that the accuracy and applicability of the proposed method are worthy of attention.
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2021-12-27
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Mahmoud, S., Al-Wassouf, A., & Ehsaan, A. (2021). Numerical Spline Method for Simulation of Stochastic Differential Equations systems. Journal of Natural Sciences, Life and Applied Sciences, 5(4), 130-111. https://doi.org/10.26389/AJSRP.L030621
