Extension of Configurational Polyhedra to Finite Temperature Property

Koretaka Yuge, Kazuya Kojima, Kazuhito Takeuchi, Tetsuya Taikei
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引用次数: 1

Abstract

Configurational polyhedora (CP) is a hyperpolyhedra on multidimensional configuration space, whose vertex (and edges) corresponds to upper or lower limit value of correlation functions for all possible atomic configuration on given lattice. In classical systems where physical property including internal energy and elastic modulus can be a linear map for structures considered, it is known that atomic configuration having highest (or lowerst) physical quantity should always locate on one of the vertices at absolute zero temperature. The present study extend the idea of CP to finite-temperature property (especially, focusing on internal energy), and successfully provides demonstration of how temperature dependence of internal energy in equilibrium state for alloys is interpreted in terms of the density of states for non-interacting system along specially selected direction on cofiguration space.
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构型多面体有限温度性质的推广
构型多面体(CP)是多维构型空间上的超多面体,其顶点(和边)对应于给定晶格上所有可能的原子构型的相关函数的上限值或下限值。在经典系统中,包括内能和弹性模量在内的物理性质可以是所考虑的结构的线性映射,众所周知,具有最高(或最低)物理量的原子构型应该始终位于绝对零度温度下的一个顶点上。本研究将CP的思想扩展到有限温度性质(特别是关注内能),并成功地证明了合金平衡态内能的温度依赖性如何用非相互作用系统在构形空间上沿特定方向的态密度来解释。
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