TY - JOUR
T1 - On the mathematics of associated solutions
JF - American Journal of Science
JO - Am J Sci
SP - 708
LP - 722
DO - 10.2475/ajs.303.8.708
VL - 303
IS - 8
AU - Victor C. Kress
Y1 - 2003/10/01
UR - http://www.ajsonline.org/content/303/8/708.abstract
N2 - Many “non-ideal” or “excess” mixing properties in solid or liquid solutions arise from homogeneous order-disorder or speciation reactions. Simple Taylor expansions, such as the commonly used Margules expansion can never exactly match the enthalpy and entropy effects associated with such homogeneous reactions. Solution modeling based on associated solution theory produces what can be a more phenomenologically sound representation of the energetics of mixing in such solutions, as well as allowing incorporation of constraints from x-ray crystallography and a wide range of spectroscopic methods. Additional non-ideal interactions between species can be incorporated by combining regular- and associated-solution theory.We present a detailed description of robust algorithms allowing calculation of homogeneous equilibrium, estimation of model properties and calculation of thermodynamic properties. Matrix algorithms are presented to allow calculation of species standard state and mixing properties in non-ideal associated solutions. Species stability and phase equilibrium calculations in associated solutions require the second derivative of Gibbs free energy with respect to the component vector (the Gibbs Hessian). A general algorithm is presented to calculate the Gibbs Hessian in ideal and non-ideal associated solutions. These algorithms can be applied in any number of components and species. Species can be of arbitrary stoichiometry.
ER -