Structural properties of additive binary hard-sphere mixtures. III. Direct correlation functions

Abstract

An analysis of the direct correlation functions cij (r) of binary additive hard-sphere mixtures of diameters σs and σb (where the subscripts s and b refer to the "small" and "big" spheres, respectively), as obtained with the rational-function approximation method and the WM scheme introduced in previous work [S.\ Pieprzyk et al., Phys.\ Rev.\ E 101, 012117 (2020)], is performed. The results indicate that the functions css(r<σs) and cbb(r<σb) in both approaches are monotonic and can be well represented by a low-order polynomial, while the function csb(r<12(σb+σs)) is not monotonic and exhibits a well defined minimum near r=12(σb-σs), whose properties are studied in detail. Additionally, we show that the second derivative csb''(r) presents a jump discontinuity at r=12(σb-σs) whose magnitude satisfies the same relationship with the contact values of the radial distribution function as in the Percus-Yevick theory.