The intracules and provide a representation of an electron distribution in
either position or momentum space but neither alone can provide a
complete description. For a combined position and momentum description
an intracule in phase space is required. Defining such an intracule is more
difficult since there is no phase space second-order reduced density. However,
the second-order Wigner distribution,
107
J. Chem. Phys.
(2003),
118,
pp. 2033.
Link
(13.26) |
can be interpreted as the probability of finding an electron at with momentum and another electron at with momentum . [The quantity is often referred to as “quasi-probability distribution” since it is not positive everywhere.]
The Wigner distribution can be used in an analogous way to the second order reduced densities to define a combined position and momentum intracule. This intracule is called a Wigner intracule, and is formally defined as
(13.27) |
If the orbitals are expanded in a basis set, then can be written as
(13.28) |
where ( is the Wigner integral
(13.29) |
Wigner integrals are similar to momentum integrals and only have four-fold permutational symmetry. Evaluating Wigner integrals is considerably more difficult that their position or momentum counterparts. The fundamental integral,
(13.30) | |||||
can be expressed as
(13.31) |
or alternatively
(13.32) |
Two approaches for evaluating have been
implemented in Q-Chem, full details can be found in Ref.
1317
Phys. Rev.
(1932),
40,
pp. 749.
Link
. The
first approach uses the first form of and used Lebedev
quadrature to perform the remaining integrations over . For high
accuracy large Lebedev grids
703
Zh. Vychisl. Mat. Mat. Fix.
(1976),
16,
pp. 293.
Link
should be used, grids of up to 5294 points are available in Q-Chem.
Alternatively, the second form can be adopted and the integrals evaluated by
summation of a series. Currently, both methods have been implemented within
Q-Chem for and basis functions only.
When computing intracules it is most efficient to locate the loop over
and/or points within the loop over shell-quartets.
221
J. Chem. Phys.
(1996),
105,
pp. 4151.
Link
However, for this requires a large amount of memory to store all the
integrals arising from each point. Consequently, an additional scheme,
in which the and points loop is outside the shell-quartet loop, is
available. This scheme is less efficient, but substantially reduces the memory
requirements.