In density functional theory calculations, the integration over the total density is
evaluated on a molecular grid that is systematically broken up into interlocking
multi-center atomic quadrature grids.
83
J. Chem. Phys.
(1988),
88,
pp. 2547.
Link
This atomic quadrature
scheme is predicated on the definition of atomic cell functions ,
that define smoothed Voronoi polyhedra centered about each atom. These cell
functions are products of switching functions that define the atomic cell of atom
, and fall rapidly from near the nucleus of , to
near any other nucleus. The integration weights provided by this scheme are
multiplied into the Lebedev quadrature weights in any practical DFT calculation:
(5.70) |
In some cases, it may be useful to print out the atomic Becke populations that are defined by these atomic cell functions. Becke population analysis may be requested by setting POP_BECKE to TRUE in the input file.
POP_BECKE
POP_BECKE
Controls the printing of atomic Becke populations.
TYPE:
LOGICAL
DEFAULT:
FALSE
OPTIONS:
TRUE
Print atomic Becke populations.
FALSE
Do not print atomic Becke populations.
RECOMMENDATION:
None
The default quadrature scheme uses atomic cell functions that intersect
precisely at bond midpoints. Consequently, the default atomic cell functions
will yield physically meaningless atomic populations. However, it is possible
to shift the intersect of the atomic cell functions using an atomic radius
criterion.
83
J. Chem. Phys.
(1988),
88,
pp. 2547.
Link
In shifting the intersect of neighboring atomic
cell functions, the point at which the Becke weights begin to fall from
to changes depending on the atomic radius of each atom.
While the choice of atomic radius is arbitrary, these atomic cell shifts
introduce a physical basis for the partitioning of the underlying atomic
quadrature. Two choices for atomic radii exist in Q-Chem for use with Becke
weights, namely the empirically derived radii introduced by Bragg and
Slater
1139
J. Chem. Phys.
(1964),
41,
pp. 3199.
Link
and the ab initio-derived weights
due to Pacios.
926
J. Comput. Chem.
(1995),
16,
pp. 133.
Link
BECKE_SHIFT
BECKE_SHIFT
Controls atomic cell shifting in determination of Becke weights.
TYPE:
STRING
DEFAULT:
BRAGG_SLATER
OPTIONS:
UNSHIFTED
Use Becke weighting without atomic size corrections,
based on bond midpoints.
BRAGG_SLATER
Use the empirical radii introduced by Bragg and Slater.
UNIVERSAL_DENSITY
Use the ab initio radii introduced by Pacios.
RECOMMENDATION:
If interested in the partitioning of the default atomic quadrature, use UNSHIFTED.
If using for physical interpretation, choose BRAGG_SLATER or UNIVERSAL_DENSITY.
All cDFT calculations and calculations where POP_BECKE = TRUE
will default to BRAGG_SLATER radii, otherwise the default grid is UNSHIFTED.
A much less arbitrary scheme with which to count electrons comes from the fragment-based Hirshfeld
partition.
1047
J. Chem. Theory Comput.
(2015),
11,
pp. 528.
Link
,
495
J. Phys. Chem. A
(2021),
125,
pp. 1243.
Link
The fragment-based Hirshfeld (FBH) partition uses weights constructed from isolated fragment densities in the form,
(5.71) |
where is the density of the isolated fragment, . Note that unlike the atomic Becke partition, the FBH partition is not constructed from linear combinations of atomic weights, but is instead built from whole fragment densities. The FBH partition comes directly from the densities of the isolated fragments, which are not as arbitrary as the choosing the effective atomic radii in the Becke partition. In order to apply FBH partitioning, one must define fragments within the $molecule section to host the constraints, but the input for the $cdft section remains unchanged and still applies constraints on a per-atom basis.
CDFT_POP
CDFT_POP
Sets the charge partitioning scheme for cDFT or cDFT-CI jobs.
TYPE:
STRING
DEFAULT:
BECKE
OPTIONS:
BECKE
Linear combination of atomic Becke functions
FBH
Fragment-based Hirshfeld partition
RECOMMENDATION:
None