Ornstein-Zernike Relation for a Fluid Mixture with Direct Correlation Functions of Finite Range

概要

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The Ornstein-Zernike relation for an n-component fluid mixture is investigated under the assumption that the direct correlation function between two particles of species i and j, c_<ij>(r). is zero when r is greater than R_<ij>≡(R_i+R_j)/2(i,j=1,2,・・・,n). The relation is transformed so as to involve the radial distribution function g_<ij>(r) only for r which is smaller than R_<ij>(i,j=1,2,・・・,n). The result is applied to a mixture of hard spheres in which R_i, giving the range of the direct correlation functions, is assumed to be the diameter of the hard spheres of species i (i=1,2,・・・,n). The direct correlation functions are found in the explicit forms, which are in complete agreement with those obtained by Lebowitz in case of a binary mixture.
社団法人日本物理学会の論文
1969-12-05