Analytic solution of the mean spherical approximation for arbitrary mixture of hard ions and hard dipoles

A solution to the mean spherical model for a mkture of chxged hard spheres of equal concentration and opposite ch;lrge, and hard dipoles, all of equal size, is given. The excess thermodynamic properties and the structure of the system depend on only 3 pxameters, which are the solution of a set of 3

The mean spherical approximation for a multicomponent mixture of charged hard spheres with sticky interactions in a uniform neutralizing background is solved analytically. When the sticky parameters are of the form A v ~ w~wj +\_ vivj, then the correlation functions and the excess thermodynamic prop

Tile mean spheriul approximation for a mi..ture of charged hard spheres in a uniform neutralizing background is solved anaIyticzlly\_ The factor correlation functions and the excess thermodynamic properties are explicitly expressed through a single parameter, which can be obtained by solving an alge

Multicomponent model of dimerizing charged hard spheres embedded in a rigid, uniform, and neutralizing background is proposed as a reference system to describe the equilibrium properties of liquid metals and alloys as well as metal-molten salt mixtures. The analytic solution of the associative mean

An analytical solution of Wertheim's associative Percus-Yevick ( APY) approximation for the n-component mixture of dimerizing hard spheres is presented. The solution is illustrated by the numerical results obtained for the two-component mixture with associative interaction only between particles of

An analytical solution of the two-density Ornstein-Zernike equation closed by the associative Percus-Yevick approximation for the multicomponent mixture of dimerizing adhesive hard spheres (DAHS) is obtained in closed form. This is the generalization of the previous solution for the one-component DA