| Tomoya KEMMOCHI.Numerical Analysis of the Allen-Cahn Equation with Coarse Meshes[J].数学研究及应用,2019,39(6):709~717 |
| Numerical Analysis of the Allen-Cahn Equation with Coarse Meshes |
| Numerical Analysis of the Allen-Cahn Equation with Coarse Meshes |
| 投稿时间:2019-08-24 修订日期:2019-10-12 |
| DOI:10.3770/j.issn:2095-2651.2019.06.014 |
| 中文关键词: Allen-Cahn equation finite difference method asymptotic behavior maximum principle |
| 英文关键词:Allen-Cahn equation finite difference method asymptotic behavior maximum principle |
| 基金项目:Supported by JSPS KAKENHI (Grant No.19K14590), Japan. |
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| 中文摘要: |
| In this paper, we consider the finite difference semi-discretization of the Allen-Cahn equation with the diffuse interface parameter $\varepsilon$. While it is natural to make the mesh size parameter $h$ smaller than $\varepsilon$, it is desirable that $h$ is as big as possible in view of computational costs. In fact, when $h$ is bigger than $\varepsilon$ (i.e., the mesh is relatively coarse), it is observed that the numerical solution does not move at all. The purpose of this paper is to clarify the mechanism of this phenomenon. We will prove that the numerical solution converges to that of the ordinary equation without the diffusion term if $h$ is bigger than $\varepsilon$. Numerical examples are presented to support the result. |
| 英文摘要: |
| In this paper, we consider the finite difference semi-discretization of the Allen-Cahn equation with the diffuse interface parameter $\varepsilon$. While it is natural to make the mesh size parameter $h$ smaller than $\varepsilon$, it is desirable that $h$ is as big as possible in view of computational costs. In fact, when $h$ is bigger than $\varepsilon$ (i.e., the mesh is relatively coarse), it is observed that the numerical solution does not move at all. The purpose of this paper is to clarify the mechanism of this phenomenon. We will prove that the numerical solution converges to that of the ordinary equation without the diffusion term if $h$ is bigger than $\varepsilon$. Numerical examples are presented to support the result. |
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