Implicit-Explicit Scheme for the Allen-Cahn Equation Preserves the Maximum Principle

Authors

Tao Tang Division of Science and Technology, BNU-HKBU United International College, Zhuhai, Guangdong, China, & SUSTech International Center for Mathematics, Southern University of Science and Technology, Shenzhen 518055, China.
Jiang Yang Department of Applied Mathematics, Columbia University, New York, NY 10027, USA

DOI:

https://doi.org/10.4208/jcm.1603-m2014-0017

Keywords:

Allen-Cahn Equations, Implicit-explicit scheme, Maximum principle, Nonlinear energy stability.

Abstract

It is known that the Allen-Chan equations satisfy the maximum principle. Is this true for numerical schemes? To the best of our knowledge, the state-of-art stability framework is the nonlinear energy stability which has been studied extensively for the phase field type equations. In this work, we will show that a stronger stability under the infinity norm can be established for the implicit-explicit discretization in time and central finite difference in space. In other words, this commonly used numerical method for the Allen-Cahn equation preserves the maximum principle.

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Published

2018-08-22

Issue

Vol. 34 No. 5 (2016)

Section

Articles