Unconditionally energy stable IEQ-FEMs for the Cahn-Hilliard equation and Allen-Cahn equation

被引：0

作者：

Chen, Yaoyao ^{[1
]}

Liu, Hailiang ^{[2
]}

Yi, Nianyu ^{[3
]}

Yin, Peimeng ^{[4
]}

机构：

[1] Anhui Normal Univ, Sch Math & Stat, Wuhu 241000, Anhui, Peoples R China

[2] Iowa State Univ, Dept Math, Ames, IA 50011 USA

[3] Xiangtan Univ, Sch Math & Computat Sci, Hunan Key Lab Computat & Simulat Sci & Engn, Xiangtan 411105, Hunan, Peoples R China

[4] Univ Texas El Paso, Dept Math Sci, El Paso, TX 79968 USA

来源：

NUMERICAL ALGORITHMS | 2024年

基金：

中国国家自然科学基金;

关键词：

Cahn-Hilliard equation; Allen-Cahn equation; Energy dissipation; Mass conservation; Finite element method; IEQ approach; FINITE-ELEMENT-METHOD; NUMERICAL-ANALYSIS; DIFFERENCE SCHEME; INTERIOR PENALTY; APPROXIMATIONS; EFFICIENT;

D O I：

10.1007/s11075-024-01910-z

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

In this paper, we present several unconditionally energy-stable invariant energy quadratization (IEQ) finite element methods (FEMs) with linear, first- and second-order accuracy for solving both the Cahn-Hilliard equation and the Allen-Cahn equation. For time discretization, we compare three distinct IEQ-FEM schemes that position the intermediate function introduced by the IEQ approach in different function spaces: finite element space, continuous function space, or a combination of these spaces. Rigorous proofs establishing the existence and uniqueness of the numerical solution, along with analyses of energy dissipation for both equations and mass conservation for the Cahn-Hilliard equation, are provided. The proposed schemes' accuracy, efficiency, and solution properties are demonstrated through numerical experiments.

引用

页数：42

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