三维准周期光子晶体的无发散投影法

Zixuan Gao, Zhenli Xu, Zhiguo Yang
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摘要

本文提出了一种用于光子准晶体问题数值近似的无点发散投影方法。通过涉及投影矩阵的变量替换,原三维准周期麦克斯韦系统被转化为高维周期系统,从而可以随时应用周期边界条件。为了处理麦克斯韦序列的内在无发散约束,我们提出了一个准周期德拉姆复数及其相关的交换图,并在此基础上提出了一个点向无发散的准周期傅里叶谱基础。在此基础上,我们提出了准周期源问题的高效求解算法,并对其进行了严格的误差估计。此外,通过分析特征函数傅里叶系数的衰减率,我们进一步提出了准周期最大傅里叶特征值问题的无辐合还原投影方法,大大降低了计算成本。
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A divergence-free projection method for quasiperiodic photonic crystals in three dimensions
This paper presents a point-wise divergence-free projection method for numerical approximations of photonic quasicrystals problems. The original three-dimensional quasiperiodic Maxwell's system is transformed into a periodic one in higher dimensions through a variable substitution involving the projection matrix, such that periodic boundary condition can be readily applied. To deal with the intrinsic divergence-free constraint of the Maxwell's equations, we present a quasiperiodic de Rham complex and its associated commuting diagram, based on which a point-wise divergence-free quasiperiodic Fourier spectral basis is proposed. With the help of this basis, we then propose an efficient solution algorithm for the quasiperiodic source problem and conduct its rigorous error estimate. Moreover, by analyzing the decay rate of the Fourier coefficients of the eigenfunctions, we further propose a divergence-free reduced projection method for the quasiperiodic Maxwell eigenvalue problem, which significantly alleviates the computational cost. Several numerical experiments are presented to validate the efficiency and accuracy of the proposed method.
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