Mean spherical model

Waisman E and Lebowitz J K 1972 Mean spherical model integral equation for charged hard spheres... [Pg.553]

Blum L 1980 Primitive electrolytes in the mean spherical model Theoretical Chemistry Advances and Perspectives vol 5 (New York Academic)... [Pg.553]

Blum, L. and Hoeye, J.S. Mean spherical model for asymmetric electrolytes 2 hemodynamic properties and the pair correlation function. 7. Phys. Chem. 1977, 81, 1311-1316. [Pg.25]

L. Blum, Mean Spherical Model for a Mixture of Hard Spheres and Hard Dipoles, Chem. Phys. Lett. 26 200 (1976). [Pg.323]

It owes that name to a study of sphericalized lattice gases by Lebowitz and Percus/ who generalized the mean spherical model of Lewis and Wannier to a cli of mean spherical models with extended hard cores, and pointed out that the lattice-gas analog of (47) holds for the whole family. Although important in its own right, that work does not seem to shed much light on the status of the approximation (17) for fluid Hamiltonians. [Pg.57]

J. L. Lebowitz and J. K. Percus, Mean spherical model for lattice gases with extended hard cores and continuum fluids, Phys. Rev. 144, 251-258 (1966). [Pg.83]

E. Waisman and J. L. Lebowitz, Mean spherical model integral equation charged hard spheres, J. Chem. Phys. 56, 3086-3099 (1972). [Pg.83]

M. S. Wertheim, Exact solution the mean spherical model for fluids hard spheres with permanent electric dipole moments, J. Chem. Phys. 55,4291-4298 (1971). [Pg.83]

L. Blum, Invariant expansion II The Omstein-Zemike equation for nonspherical molecules and an extended solution to the mean spherical model, /. Chem. Phys. 57,1862-1869 (1972). [Pg.83]

L. Blum, Mean spherical model for asymmetric electrol3rtes. I Method of solution. Mol. Phys. 30,1529 (1975). [Pg.135]

R. G. Palmer and J. D. Weeks, Exact solution of the mean spherical model for charged hard spheres in a uniform neutralizing background, J. Chem. Phys. 58,4171 (1973). [Pg.135]

D. A. Macinnes and I. E. Farquhar, Exact solution of the mean spherical model for fluids of non-spherical molecules II., Mol. Phys. 30, 889 (1975). [Pg.135]

Andersen, H. C. and D. Chandler. 1972. Optimized cluster expansions for classical fluids. 1. General theory and variational formulation of the mean spherical model and hard sphere Percus-Yevick equations. Journal of Chemical Physics. 57, 1918. [Pg.325]

Blum L (1975) Mean spherical model for asymmetric electrolytes. Mol Phys 30 1529-1535... [Pg.2076]

Chandler, D., Schweizer, K.S. and Wolynes, P.G., 1982, Electronic states of typologically disordered systems Exact solution of the mean spherical model for liquids, Phys. Rev. Lett., 49 110. [Pg.248]

D. Chandler, K. S. Schweizer, andP. G. Wolynes, P/>ys. Rev. Lett., 49,1100 (1982). Electronic States of a Topologically Disordered System - Exact Solution of the Mean Spherical Model for Liquids. [Pg.299]

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