截断(统计)
计算
傅里叶变换
情态动词
曲面(拓扑)
笛卡尔坐标系
因式分解
数值分析
计算机科学
傅里叶级数
算法
数学
数学分析
几何学
材料科学
机器学习
高分子化学
标识
DOI:10.1364/josaa.14.002758
摘要
A new formulation of the Fourier modal method (FMM) that applies the correct rules of Fourier factorization for crossed surface-relief gratings is presented. The new formulation adopts a general nonrectangular Cartesian coordinate system, which gives the FMM greater generality and in some cases the ability to save computer memory and computation time. By numerical examples, the new FMM is shown to converge much faster than the old FMM. In particular, the FMM is used to produce well-converged numerical results for metallic crossed gratings. In addition, two matrix truncation schemes, the parallelogramic truncation and a new circular truncation, are considered. Numerical experiments show that the former is superior.
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