Reduced-Order Modelling for the Allen-Cahn Equation Based on Scalar Auxiliary Variable Approaches

IF 0.8 4区数学

数学研究 Pub Date : 2019-06-01 DOI:10.4208/jms.v52n3.19.03

Xiaolan Zhou sci

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引用次数: 7

Abstract

In this article, we study the reduced-order modelling for Allen-Cahn equation. First, a collection of phase field data, i.e., an ensemble of snapshots of at some time instances is obtained from numerical simulation using a time-space discretization. The full discretization makes use of a temporal scheme based on the scalar auxiliary variable approach and a spatial spectral Galerkin method. It is shown that the time stepping scheme is unconditionally stable. Then a reduced order method is developed using by proper orthogonal decomposition (POD) and discrete empirical interpolation method (DEIM). It is well-known that the Allen-Cahn equations have a nonlinear stability property, i.e., the free-energy functional decreases with respect to time. Our numerical experiments show that the discretized Allen-Cahn system resulting from the POD-DEIM method inherits this favorable property by using the scalar auxiliary variable approach. A few numerical results are presented to illustrate the performance of the proposed reduced order method. In particular, the numerical results show that the computational efficiency is significantly enhanced as compared to directly solving the full order system. AMS subject classifications: 76T10, 78M34, 74S25

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基于标量辅助变量方法的Allen-Cahn方程降阶建模

本文研究了Allen-Cahn方程的降阶建模。首先，采用时间-空间离散的方法，通过数值模拟得到一组相场数据，即某一时刻的快照集合。完全离散化采用了基于标量辅助变量方法的时间格式和空间谱伽辽金方法。证明了时间步进格式是无条件稳定的。然后利用正交分解(POD)和离散经验插值法(DEIM)提出了一种降阶方法。众所周知，Allen-Cahn方程具有非线性稳定性，即自由能泛函随时间减小。数值实验表明，采用标量辅助变量方法，由POD-DEIM方法得到的离散Allen-Cahn系统继承了这一优点。给出了一些数值结果来说明所提出的降阶方法的性能。数值结果表明，与直接求解全阶系统相比，计算效率得到了显著提高。AMS学科分类:76T10、78M34、74S25

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数学研究 MATHEMATICS-

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1109

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