NUMERICAL METHOD FOR SOLVING THE DIRICHLET BOUNDARY VALUE PROBLEM FOR NONLINEAR TRIHARMONIC EQUATION

D. A, Hung Nguyen Quoc, Quang Vu Vinh
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Abstract

In this work, we consider the Dirichlet boundary value problem for nonlinear triharmonic equation. Due to the reduction of the problem to operator equation for the pair of the right hand side function and the unknown second normal derivative of the function to be sought, we design an iterative method at both continuous and discrete levels for numerical solution of the problem. Some examples demonstrate that the numerical method is of fourth order convergence. When the right hand side function does not depend on the unknown function and its derivatives, the numerical method gives more accurate results in comparison with the results obtained by the interior method of Gudi and Neilan.
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求解非线性三谐方程dirichlet边值问题的数值方法
本文研究了非线性三调和方程的Dirichlet边值问题。由于将问题简化为右侧函数对的算子方程和待求函数的未知二阶法向导数,我们设计了一种连续和离散水平的迭代方法来数值求解问题。算例表明,数值方法具有四阶收敛性。当右侧函数不依赖于未知函数及其导数时,数值方法给出的结果比Gudi和Neilan的内部方法得到的结果更准确。
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