一种理想准晶格的数学模型

Mathematical Model for Structure of Ideal Quasicrystal Lattices

  • 摘要: 本文提出了一种理想准晶格的数学模型,它的平面投影图中,平行的水平直线上结点服从Fibonacci排列;而每个分离的呈环状结点的中心都是局部5次对称中心;两个相叠(相分离)的环状结点外层均布着14(16)个结点,很圆满地描述了Hiraga等人的锰-铝准晶体高分辨图。

     

    Abstract: In this paper, a mathematical model for structure of ideal quasicrystal lattices is set up. This Model describes very beautifully the following phenomena which is shown in the electron micrograph of the Mn-Al quasicrystal obtained by Hiraga et al. In some local areas, ten bright dots groups are distributed in concentric circles; sixteen bright dots are distributed the surroundings of every two neighbourhood righs of bright dots; and fourteen bright dots arc distributed the surroundings of every double overlapping rings of bright dots. Therefore, it seems that this model can explain more phenomena in Mn-Al alloy quasicrystal than those reported by Hiraga et al, and could offer some new ideas for the theoretical research of structure of quasicrystal.

     

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