两个空间格及其格平面的重合系数

July 16 Pub Date : 1982-07-16 DOI:10.1002/PSSA.2210720135

Q. B. Yang

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引用次数: 1

摘要

宇宙拉提斯和两个较大空间的交叉方程计划均由数字基本理论制定。《coincidence coefficient of二号太空lattices是α2 = kk / d3,鞋的形状的lattice计划是α=α2 (f) . (2)以基本数值理论确定两个网格及其位值的共同和直接公式。在一两个Raumgitter Koinzidenzkoeffizient betragtα2 = kk / d3和其Gitterebenenα=α2 (f) . (2)

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Coincidence Coefficients of Two Space Lattices and Their Lattice Planes

Universal and straight-forward formulae to find the coincidence coefficients of two space lattices and their lattice planes are given by means of elementary theory of numbers. The coincidence coefficient of two space lattices is α2 = kk/d3, and that of their lattice planes is α = α2(CH(2)). Eine universelle und direkte Formel zur Auffindung der Koinzidenzkoeffizienten zweier Gitter und ihrer Gitterebenen wird mittels elementarer Zahlentheorie angegeben. Der Koinzidenzkoeffizient zweier Raumgitter betragt α2 = kk/d3 und der ihrer Gitterebenen α = α2(CH(2)).

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July 16

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