求解广义非线性系统二阶边值问题的数值方法:伽辽金法

Sadia Akter Lima, Md. Shafiqul Islam, Hazrat Ali̇, M. Kamrujjaman
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引用次数: 0

摘要

本文研究一类二阶非线性边值问题。重点研究了不同类型非线性BVPs的Galerkin有限元数值解。首先,我们提出了这类问题的广义广义有限元公式。然后用广义有限元法确定了一类二阶非线性BVPs的近似解。近似结果以表格形式展开,并与精确解一起用图形表示。结果表明了该方案的适用性、兼容性和准确性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Numerical method to solve generalized nonlinear system of second order boundary value problems: Galerkin approach
In this study, we consider the system of second order nonlinear boundary value problems (BVPs). We focus on the numerical solutions of different types of nonlinear BVPs by Galerkin finite element method (GFEM). First of all, we originate the generalized formulation of GFEM for those type of problems. Then we determine the approximate solutions of a couple of second order nonlinear BVPs by GFEM. The approximate results are unfolded in tabuler form and portrayed graphically along with the exact solutions. Those results demonstrate the applicability, compatibility and accuracy of this scheme.
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