分拆(数论)
动能
增长模型
计算机科学
统计物理学
数学
物理
组合数学
经典力学
数理经济学
作者
Michael W. Anderson,James Gebbie-Rayet,Adam Hill,Nani Farida,Martin P. Attfield,Pablo Cubillas,Vladislav A. Blatov,Davide Μ. Proserpio,Duncan Akporiaye,Bjørnar Arstad,Julian D. Gale
出处
期刊:Nature
[Nature Portfolio]
日期:2017-03-30
卷期号:544 (7651): 456-459
被引量:124
摘要
Understanding and predicting crystal growth is fundamental to the control of functionality in modern materials. Despite investigations for more than one hundred years, it is only recently that the molecular intricacies of these processes have been revealed by scanning probe microscopy. To organize and understand this large amount of new information, new rules for crystal growth need to be developed and tested. However, because of the complexity and variety of different crystal systems, attempts to understand crystal growth in detail have so far relied on developing models that are usually applicable to only one system. Such models cannot be used to achieve the wide scope of understanding that is required to create a unified model across crystal types and crystal structures. Here we describe a general approach to understanding and, in theory, predicting the growth of a wide range of crystal types, including the incorporation of defect structures, by simultaneous molecular-scale simulation of crystal habit and surface topology using a unified kinetic three-dimensional partition model. This entails dividing the structure into 'natural tiles' or Voronoi polyhedra that are metastable and, consequently, temporally persistent. As such, these units are then suitable for re-construction of the crystal via a Monte Carlo algorithm. We demonstrate our approach by predicting the crystal growth of a diverse set of crystal types, including zeolites, metal-organic frameworks, calcite, urea and l-cystine.
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