On the calculation of matrix elements of operators between symmetry-projected Bogoliubov states

A general algebraic theorem IS presented to calculate the matrLz elements of symmetry operators m a bassls of determlnantal wavefunctlons. It IS also shown how the matrix elements of complementary open-shell wavefunctions are related to each other.

Local coordinate systems are chosen for each quadruple of atoms relative to a four-center integral, in order to avoid linear combinations of orbitals when symmetry operations perform on an orbital. This choice can utilize the complete molecular symmetry to attain the optimal number of symmetry-uniqu

The non-diagonal matrix elements in the adiabatic Born-Oppenheimer approximation are considered. The effect of the Q-dependence of the electronic energy denominator is calculated explicitly for an arbitrary initial and final state. It is shown that the inclusion of this effect does not change the re

To find all components T ؎q (k) ‫؍‬ N k,q J ؎ q ¥ m‫0؍‬ k؊q (؎1) k؊m a(k, q; m)J z m (0 < q < k) of an irreducible tensor operator of rank k, a recursion formula for the coefficients a(k, q; m) is derived. Various kinds of operator equivalents and forms of their expression are examined. Matrix eleme