Quantitative crystal structure descriptors from multiplicative congruential generators.

IF 1.8 4区 材料科学
Acta Crystallographica Section A Pub Date : 2012-03-01 Epub Date: 2012-01-12 DOI:10.1107/S0108767311049853
Wolfgang Hornfeck
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引用次数: 5

Abstract

Special types of number-theoretic relations, termed multiplicative congruential generators (MCGs), exhibit an intrinsic sublattice structure. This has considerable implications within the crystallographic realm, namely for the coordinate description of crystal structures for which MCGs allow for a concise way of encoding the numerical structural information. Thus, a conceptual framework is established, with some focus on layered superstructures, which proposes the use of MCGs as a tool for the quantitative description of crystal structures. The multiplicative congruential method eventually affords an algorithmic generation of three-dimensional crystal structures with a near-uniform distribution of atoms, whereas a linearization procedure facilitates their combinatorial enumeration and classification. The outlook for homometric structures and dual-space crystallography is given. Some generalizations and extensions are formulated in addition, revealing the connections of MCGs with geometric algebra, discrete dynamical systems (iterative maps), as well as certain quasicrystal approximants.

从乘法同余生成的定量晶体结构描述符。
特殊类型的数论关系,称为乘法同余生成(mcg),表现出内在的子格结构。这在晶体学领域具有相当大的意义,即晶体结构的坐标描述,其中mcg允许以简洁的方式编码数值结构信息。因此,建立了一个概念框架,重点关注层状超结构,提出使用mcg作为晶体结构定量描述的工具。乘法同余方法最终提供了一种生成原子分布接近均匀的三维晶体结构的算法,而线性化过程则促进了它们的组合枚举和分类。展望了同规结构和双空间晶体学的发展前景。此外,还提出了一些推广和扩展,揭示了mcg与几何代数、离散动力系统(迭代映射)以及某些准晶体近似的联系。
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来源期刊
自引率
11.10%
发文量
0
审稿时长
3 months
期刊介绍: Acta Crystallographica Section A: Foundations and Advances publishes articles reporting advances in the theory and practice of all areas of crystallography in the broadest sense. As well as traditional crystallography, this includes nanocrystals, metacrystals, amorphous materials, quasicrystals, synchrotron and XFEL studies, coherent scattering, diffraction imaging, time-resolved studies and the structure of strain and defects in materials. The journal has two parts, a rapid-publication Advances section and the traditional Foundations section. Articles for the Advances section are of particularly high value and impact. They receive expedited treatment and may be highlighted by an accompanying scientific commentary article and a press release. Further details are given in the November 2013 Editorial. The central themes of the journal are, on the one hand, experimental and theoretical studies of the properties and arrangements of atoms, ions and molecules in condensed matter, periodic, quasiperiodic or amorphous, ideal or real, and, on the other, the theoretical and experimental aspects of the various methods to determine these properties and arrangements.
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