Hermite Matrix Polynomial Collocation Method for Linear Complex Differential Equations and Some Comparisons

Mina Bagherpoorfard; Fahime Akhavan Ghassabzade

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Hermite Matrix Polynomial Collocation Method for Linear Complex Differential Equations and Some Comparisons

机译：线性复微分方程的Hermite矩阵多项式配置方法及一些比较

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In this paper, we introduce a Hermite operational matrix collocation method for solving higher-order linear complex differential equations in rectangular or elliptic domains. We show that based on a linear algebra theorem, the use of different polynomials such as Hermite, Bessel and Taylor in polynomial collocation methods for solving differential equations leads to an equal solution, and the difference in the numerical results arises from the difference in the coefficient matrix of final linear systems of equations. Some numerical examples will also be given.

机译：在本文中，我们介绍了一种Hermite运算矩阵搭配方法，用于求解矩形或椭圆形域中的高阶线性复微分方程。我们表明，基于线性代数定理，在多项式搭配方法中使用诸如Hermite，Bessel和Taylor之类的多项式求解微分方程可得出相等的解，而数值结果的差异则源于系数的差异最终线性方程组矩阵。还将给出一些数值示例。

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《Journal of Applied Mathematics and Physics》 |2013年第5期|共7页
作者
Mina Bagherpoorfard; Fahime Akhavan Ghassabzade;
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中图分类物理学;
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入库时间 2022-08-18 16:11:21

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Hermite Matrix Polynomial Collocation Method for Linear Complex Differential Equations and Some Comparisons

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