铁电薄膜相变变分相场模型的数值离散化

Ruo Li, Q. Du, Lei Zhang
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引用次数: 0

摘要

相场法被广泛应用于铁电薄膜的相变和极化开关研究。本文基于静电能量的变分形式和极化矢量的松弛动力学,提出了一种有效的变分相场模型的数值格式。空间离散化将傅里叶谱法和有限差分法结合起来处理三维混合边界条件。它允许对松弛动力学的时间积分进行有效的半隐式离散化。该方法避免了显式求解静电平衡方程(泊松方程),并消除了相关拉格朗日乘子的使用。我们给出了包括相变和极化开关过程在内的几个数值例子来证明该方法的有效性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Numerical Discretization of Variational Phase Field Model for Phase Transitions in Ferroelectric Thin Films
Phase field methods have been widely used to study phase transitions and polarization switching in ferroelectric thin films. In this paper, we develop an efficient numerical scheme for the variational phase field model based on variational forms of the electrostatic energy and the relaxation dynamics of the polarization vector. The spatial discretization combines the Fourier spectral method with the finite difference method to handle three-dimensional mixed boundary conditions. It allows for an efficient semi-implicit discretization for the time integration of the relaxation dynamics. This method avoids explicitly solving the electrostatic equilibrium equation (a Poisson equation) and eliminates the use of associated Lagrange multipliers. We present several numerical examples including phase transitions and polarization switching processes to demonstrate the effectiveness of the proposed method.
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