布里渊区
对称(几何)
凸壳
还原(数学)
算法
多边形网格
自由度(物理和化学)
简单(哲学)
计算机科学
数学
物理
正多边形
几何学
光学
量子力学
认识论
哲学
作者
Jeremy J. Jorgensen,John E. Christensen,Tyler J. Jarvis,Gus L. W. Hart
标识
DOI:10.4208/cicp.oa-2021-0094
摘要
Calculations of properties of materials require performing numerical integrals over the Brillouin zone (BZ). Integration points in density functional theory codes are uniformly spread over the BZ (despite integration error being concentrated in small regions of the BZ) and preserve symmetry to improve computational efficiency. Integration points over an irreducible Brillouin zone (IBZ), a rotationally distinct region of the BZ, do not have to preserve crystal symmetry for greater efficiency. This freedom allows the use of adaptive meshes with higher concentrations of points at locations of large error, resulting in improved algorithmic efficiency. We have created an algorithm for constructing an IBZ of any crystal structure in 2D and 3D. The algorithm uses convex hull and half-space representations for the BZ and IBZ to make many aspects of construction and symmetry reduction of the BZ trivial. The algorithm is simple, general, and available as open-source software.
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