利用贝塞b样条松弛格式求解benjaminbona - mahony方程

N. Rahan, N. Hamid, Ahmad Abd. Majid, A. Ismail
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引用次数: 1

摘要

本文采用三次b样条(CBS)配点法对Benjamin-Bona-Mahony (BBM)方程进行了数值求解。将BBM方程转化为双方程系统,并将贝塞公式应用于非线性项。然后,采用前向差分逼近对时间导数进行离散化,采用CBS函数对空间维度进行离散化。讨论了两个数值算例,并与精确解进行了比较。本文采用三次b样条(CBS)配点法对Benjamin-Bona-Mahony (BBM)方程进行了数值求解。将BBM方程转化为双方程系统,并将贝塞公式应用于非线性项。然后,采用前向差分逼近对时间导数进行离散化,采用CBS函数对空间维度进行离散化。讨论了两个数值算例,并与精确解进行了比较。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Solving Benjamin-Bona-Mahony equation using besse B-spline relaxation scheme
In this research, the Benjamin-Bona-Mahony (BBM) equation is solved numerically using cubic B-spline (CBS) collocation method. The BBM equation is transformed into a system of two equations and Besse’s formula is applied to the nonlinear term. Then, Forward Difference Approximation is used to discretize the time derivative while the CBS function is used to discretize the space dimension. Two numerical examples are discussed and compared with the exact solutions.In this research, the Benjamin-Bona-Mahony (BBM) equation is solved numerically using cubic B-spline (CBS) collocation method. The BBM equation is transformed into a system of two equations and Besse’s formula is applied to the nonlinear term. Then, Forward Difference Approximation is used to discretize the time derivative while the CBS function is used to discretize the space dimension. Two numerical examples are discussed and compared with the exact solutions.
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