A Novel Study Based on Shifted Jacobi Polynomials to Find the Numerical Solutions of Nonlinear Stochastic Differential Equations Driven by Fractional Brownian Motion

IF 1 4区 数学 Q3 MATHEMATICS, APPLIED
P. K. Singh, S. Saha Ray
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引用次数: 3

Abstract

Abstract The main objective of this article is to represent an efficient numerical approach based on shifted Jacobi polynomials to solve nonlinear stochastic differential equations driven by fractional Brownian motion. In this method, function approximation and operational matrices based on shifted Jacobi polynomials have been studied, which are further used with appropriate collocation points to reduce nonlinear stochastic differential equations driven by fractional Brownian motion into a system of algebraic equations. Newton’s method has been used to solve this nonlinear system of equations, and the desired approximate solution is achieved. Moreover, the error and convergence analysis of the presented method are also established in detail. Additionally, the applicability of the proposed method is demonstrated by solving some numerical examples.
基于移位Jacobi多项式求分数阶布朗运动驱动非线性随机微分方程数值解的新研究
摘要本文的主要目的是提出一种基于移位雅可比多项式的求解分数布朗运动驱动的非线性随机微分方程的有效数值方法。在该方法中,研究了基于移位雅可比多项式的函数逼近和运算矩阵,并将其与适当的配置点结合起来,将分数布朗运动驱动的非线性随机微分方程简化为代数方程组。将牛顿方法用于求解这一非线性方程组,得到了所需的近似解。此外,还对该方法的误差和收敛性进行了详细的分析。此外,通过算例验证了该方法的适用性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
2.40
自引率
7.70%
发文量
54
期刊介绍: The highly selective international mathematical journal Computational Methods in Applied Mathematics (CMAM) considers original mathematical contributions to computational methods and numerical analysis with applications mainly related to PDEs. CMAM seeks to be interdisciplinary while retaining the common thread of numerical analysis, it is intended to be readily readable and meant for a wide circle of researchers in applied mathematics. The journal is published by De Gruyter on behalf of the Institute of Mathematics of the National Academy of Science of Belarus.
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