Geometric programming and the Darwin-Fowler ... - ACS Publications

Geometric programming and the Darwin-Fowler method in statistical mechanics. R. J. Duffin, and Clarence Zener. J. Phys. Chem. , 1970, 74 (12), pp 2419...
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2419

GEOMETRIC PROGRAMMING IN STATISTICAL MECHANICS

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equivalent to adding (n(n- 1) - Z(1 1))/2r2 to the Hamiltonian in eq A2. A more drastic approximation can be made by replacing the .zN/rlN in eq A2 by 2a2r2 - 1(1 1)/2r2. The resulting Gaussian functions e-a'BY2nconstitute an inferior basis set and are only used because the multicenter, two-electron integrals become easier to evaluate. I n any case, the point of this discussion is that if a perturbation which is a sum of one-electron operators is included, in eq A l , we can proceed in the same way as before and no new approximations need to be introduced. I n the presence of a perturbation, eq A1 becomes

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i

iic

field of all the nuclei plus the perturbation. I n the vicinity of the nucleus N the Hamiltonian is approximately "(A)

=

-'/zV'(I)

i