Equations of state of freely jointed hard-sphere chain fluids: Theory

• Published in: The Journal of chemical physics Vol. 110; no. 11; pp. 5444 - 5457
• Main Authors: Stell, G., Lin, C.-T., Kalyuzhnyi, Yu. V.
• Format: Journal Article
• Language: English
• Published: 15.03.1999
• ISSN: 0021-9606; 1089-7690
• DOI: 10.1063/1.478440

Using the analytical solution of a multidensity integral equation solved in our previous papers [J. Chem. Phys. 108, 6513, 6525 (1998)], we derive two compressibility and two virial equations of state (EOS) for freely jointed hard-sphere chain fluids on the basis of the approximations defined by the polymer Percus–Yevick (PPY) closure and of the PPY ideal-chain closure for the integral equations. We also extend a version of first-order thermodynamic perturbation theory to polymers, using a dimer fluid as the reference system, to treat mixtures of heteronuclear chain fluids and polymer solutions; the structural information of the dimer fluid is obtained from the PPY ideal-chain approximation in the complete-association limit. The attractive forces between monomers of chain molecules are treated using simple perturbation theory. We find that the compressibility EOS derived on the basis of the PPY approximation subject to the chain-connectivity condition reduces to the compressibility EOS based upon the PPY ideal-chain approximation in the complete-association limit, which is also equivalent to the EOS derived by Chiew [Mol. Phys. 70, 129 (1990)] and to the EOS derived by Kalyuzhnyi and Cummings [J. Chem. Phys. 105, 2011 (1996)]. On the other hand, the virial EOS derived on the basis of the PPY ideal-chain approximation coincides with Attard’s virial EOS [J. Chem. Phys. 102, 5411 (1995)] only in the zero-density limit. The advantages in numerical implementation of the EOS presented in this work are also discussed, but a full quantitative assessment of our results and a detailed numerical comparison among them are made in a companion paper, as is comparison with available simulation results.