A Functional Analytic Approach to the Power Series Solutions of an Nonlinear Differential Equations

机译：非线性微分方程幂级数解的泛函分析方法

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A functional analytic method was developed by E.K.Ifantis in 1987 to prove that certain non-linear ordinary differential equation (ODEs) have a unique power series solution which converges absolutely in a specified disc of the complex plane. In this thesis, we extended this method to certain systems of two non-linear ordinary differential equations.We then applied the result to an nonlinear differential system and obtained the power series solutions.

机译：E.K. Ifantis在1987年开发了一种函数分析方法，以证明某些非线性常微分方程（ODE）具有唯一的幂级数解，该幂阶解绝对收敛于复杂平面的特定圆盘中。在本文中，我们将该方法扩展到两个非线性常微分方程的某些系统，然后将结果应用于非线性微分系统，并获得幂级数解。

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《Asia-Pacific Power and Energy Engineering Conference;APPEEC》|2012年|p.1- 4|共4页
会议地点 Shanghai(CN)
作者
Xu, Liang;
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A Functional Analytic Approach to the Power Series Solutions of an Nonlinear Differential Equations

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