| 非线性算子方程的泰勒展式算法 |
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| 引用本文: | 何银年,李开泰.非线性算子方程的泰勒展式算法[J].数学学报,1998,41(2):317-326. |
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| 作者姓名: | 何银年 李开泰 |
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| 作者单位: | 西安交通大学应用数学研究中心 |
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| 基金项目: | 国家自然科学基金,基础研究攀登计划 |
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| 摘 要: | 本文的目的是给出一种解Hilbert空间中非线性方程的k阶泰勒展式算法(k1).标准Galerkin方法可以看作1阶泰勒展式算法,而最优非线性Galerkin方法可视为2阶泰勒展式算法.我们应用这种算法于定常的Navier-Stokes方程的数值逼近.在一定情景下,最优非线性Galerkin方法提供比标准Galerkin方法和非线性Galerkin方法更高阶的收敛速度.
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| 关 键 词: | 非线性算子方程,Navier-Stokes方程,泰勒展式算法,最优非线性Galerkin方法 |
| 收稿时间: | 1996-9-19 |
| 修稿时间: | 1997-4-7 |
Taylor Expansion Algorithm for the Nonlinear Operator Equations |
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| He Yinnian,Li Kaitai.Taylor Expansion Algorithm for the Nonlinear Operator Equations[J].Acta Mathematica Sinica,1998,41(2):317-326. |
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| Authors: | He Yinnian Li Kaitai |
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| Institution: | He Yinnian Li Kaitai ( Research Center for Applied Mathematics, Xi’an Jiaotong University, Xi’an 710049, China ) |
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| Abstract: | The aim of this paper is to present a general algorithm for solving the nonlinear operator equations in a Hilbert space, namely the k -order Taylor expansion algorithm, k1 . The standard Galerkin method can be viewed as the 1-order Taylor expansion algorithm; while the optimum nonlinear Galerkin method can be viewed as the 2-order Taylor expansion algorithm. The general algorithm is then applied to the study of the numerical approximations for the steady Navier-Stokes equations. Finally, the theoretical analysis and numerical experiments show that, in some situations, the optimum nonlinear Galerkin method provides higher convergencerate than the standard Galerkin method and nonlinear Galerkin method. |
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| Keywords: | Nonlinear operator equation Navier-Stokes equations Taylor expansion algorithm Optimum nonlinear Galerkin method |
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