POLYNOMIAL APPROACH FOR THE MOST GENERAL LINEAR FREDHOLM INTEGRODIFFERENTIAL-DIFFERENCE EQUATIONS USING TAYLOR MATRIX METHOD

MEHMET SEZER; MUSTAFA GULSU

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POLYNOMIAL APPROACH FOR THE MOST GENERAL LINEAR FREDHOLM INTEGRODIFFERENTIAL-DIFFERENCE EQUATIONS USING TAYLOR MATRIX METHOD

机译：泰勒矩阵法求解最一般线性Fredholm积分微分方程的多项式方法

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A Taylor matrix method is developed to find an approximate solution of the most general linear Fredholm integrodifferential-difference equations with variable coefficients under the mixed conditions in terms of Taylor polynomials. This method transforms the given general linear Fredholm integrodifferential-difference equations and the mixed conditions to matrix equations with unknown Taylor coefficients. By means of the obtained matrix equations, the Taylor coefficients can be easily computed. Hence, the finite Taylor series approach is obtained. Also, examples are presented and the results are discussed.

机译：开发泰勒矩阵方法，以根据泰勒多项式在混合条件下找到最通用的具有可变系数的线性Fredholm积分微分方程的近似解。该方法将给定的通用线性Fredholm积分微分方程和混合条件转换为未知泰勒系数的矩阵方程。借助于获得的矩阵方程，可以容易地计算泰勒系数。因此，获得了有限泰勒级数方法。此外，还提供了示例并讨论了结果。

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《International journal of mathematics and mathematical sciences》 |2006年第7期|共15页
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MEHMET SEZER; MUSTAFA GULSU;
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正文语种 eng
中图分类数学;
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1. Polynomial approach for the most general linear Fredholm integrodifferential-difference equations using Taylor matrix method [J] . MehmetSezer, MustafaGülsu International journal of mathematics and mathematical sciences . 2006,第7期

机译：泰勒矩阵法求解最一般线性Fredholm积分微分方程的多项式方法
2. Polynomial solution of the most general linear Fredholm integrodifferential-difference equations by means of Taylor matrix method [J] . Mehmet Sezer, Mustafa Gulsu Complex variables theory and application . 2005,第5期

机译：泰勒矩阵法求解最一般线性Fredholm积分微分方程的多项式解
3. Polynomial solution of the most general linear Fredholm-Volterra integrodifferential-difference equations by means of Taylor collocation method [J] . Sezer M, Gulsu M Applied mathematics and computation . 2007,第1期

机译：泰勒搭配法求解最一般线性Fredholm-Volterra积分微分方程的多项式解
4. Numerical solution of nonlinear Fredholm integral equations of second kind by using hybrid of block-pulse functions and Taylor series [C] . 2010 IEEE International Conference on Progress in Informatics and Computing . 2010

机译：块脉冲函数与泰勒级数混合求解第二类非线性Fredholm积分方程的数值解
5. THE NUMERICAL SOLUTION OF LINEAR FIRST KIND FREDHOLM INTEGRAL EQUATIONS USING AN ITERATIVE METHOD [D] . SCHMIDT, ROBERT CRAIG 1987

机译：线性一类Fredholm积分方程的迭代法数值解
6. Solution of the Nonlinear Mixed Volterra-Fredholm Integral Equations by Hybrid of Block-Pulse Functions and Bernoulli Polynomials [O] . S. Mashayekhi, M. Razzaghi, O. Tripak -1

机译：块脉冲函数与伯努利多项式混合求解非线性混合Volterra-Fredholm积分方程
7. Generalized Taylor Matrix Method for Solving Multi-Higher Nonlinear Integro-Fractional Differential Equations of Fredholm Type [O] . Bzhween A. Saeed, Main Article Content Shazad Sh. Ahmed 2019

机译：用于求解Fredholm型多高度非线性积分分数微分方程的广义泰勒矩阵方法

POLYNOMIAL APPROACH FOR THE MOST GENERAL LINEAR FREDHOLM INTEGRODIFFERENTIAL-DIFFERENCE EQUATIONS USING TAYLOR MATRIX METHOD

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