As pointed out in Ref.
314
J. Chem. Phys.
(2003),
119,
pp. 2943.
Link
and elsewhere, the description
of charge-transfer excited states within density functional theory (or more
precisely, time-dependent DFT, which is discussed in Section 7.3)
requires full (100%) non-local HF exchange, at least in the limit of large
donor–acceptor distance. Hybrid functionals such as
B3LYP
85
J. Chem. Phys.
(1993),
98,
pp. 5648.
Link
,
1179
J. Phys. Chem.
(1994),
98,
pp. 11623.
Link
and PBE0
20
J. Chem. Phys.
(1999),
111,
pp. 2889.
Link
that are
well-established and in widespread use, however, employ only 20% and 25% HF
exchange, respectively. While these functionals provide excellent results for
many ground-state properties, they cannot correctly describe the distance
dependence of charge-transfer excitation energies, which are enormously
underestimated by most common density functionals. This is a serious problem
in any case, but it is a catastrophic problem in large molecules and in
non-covalent clusters, where TDDFT often predicts a near-continuum of spurious,
low-lying charge transfer states.
679
J. Chem. Theory Comput.
(2007),
3,
pp. 1680.
Link
,
681
J. Am. Chem. Soc.
(2009),
131,
pp. 124115.
Link
The problems with
TDDFT’s description of charge transfer are not limited to large donor–acceptor
distances, but have been observed at 2 Å separation, in systems as
small as uracil–(HO).
679
J. Chem. Theory Comput.
(2007),
3,
pp. 1680.
Link
Rydberg excitation energies
also tend to be substantially underestimated by standard TDDFT.
One possible avenue by which to correct such problems is to parameterize functionals that contain 100% HF exchange, though few such functionals exist to date. An alternative option is to attempt to preserve the form of common GGAs and hybrid functionals at short range (i.e., keep the 25% HF exchange in PBE0) while incorporating 100% HF exchange at long range, which provides a rigorously correct description of the long-range distance dependence of charge-transfer excitation energies, but aims to avoid contaminating short-range exchange-correlation effects with additional HF exchange. The separation is accomplished using the range-separation ansatz that was introduced in Section 5.3. In particular, functionals that use 100% HF exchange at long range ( in Eq. (5.13)) are known as “long-range-corrected” (LRC) functionals. An LRC version of PBE0 would, for example, have .
To fully specify an LRC functional, one must choose a value for the range
separation parameter in Eq. (5.12). In the limit
, the LRC functional in Eq. (5.13) reduces to
a non-RSH functional where there is no “SR” or “LR”, because all exchange
and correlation energies are evaluated using the full Coulomb operator,
. Meanwhile the limit corresponds to a
new functional, . Full HF exchange
is inappropriate for use with most contemporary GGA correlation functionals, so
the latter limit is expected to perform quite poorly. Values of bohr are likely not worth considering, according to benchmark
tests.
686
J. Phys. Chem. B
(2008),
112,
pp. 6304.
Link
,
1061
J. Chem. Phys.
(2008),
129,
pp. 034107.
Link
Evaluation of the short- and long-range HF exchange energies is
straightforward,
24
J. Comput. Chem.
(1999),
20,
pp. 921.
Link
so the crux of any RSH functional is the
form of the short-range GGA exchange functional, and several such functionals
are available in Q-Chem. These include short-range variants of the B88 and
PBE exchange described by Hirao and co-workers,
546
J. Chem. Phys.
(2001),
115,
pp. 3540.
Link
,
1155
J. Chem. Phys.
(2007),
126,
pp. 154105.
Link
called B88 and PBE in Q-Chem,
1054
J. Chem. Theory Comput.
(2011),
7,
pp. 1296.
Link
and an
alternative formulation of short-range PBE exchange proposed by Scuseria and
co-workers,
492
J. Chem. Phys.
(2008),
128,
pp. 194105.
Link
which is known as PBE. These
functionals are available in Q-Chem thanks to the efforts of the Herbert
group.
1061
J. Chem. Phys.
(2008),
129,
pp. 034107.
Link
,
1062
J. Chem. Phys.
(2009),
130,
pp. 054112.
Link
By way of notation, the terms
“PBE”, “PBE”, etc., refer only to the short-range exchange
functional, in Eq. (5.13). These
functionals could be used in “screened exchange” mode, as described in
Section 5.3, as for example in the HSE03
functional,
511
J. Chem. Phys.
(2003),
118,
pp. 8207.
Link
therefore the designation “LRC-PBE”, for
example, should only be used when the short-range exchange functional
PBE is combined with 100% Hartree-Fock exchange in the long range.
In general, LRC-DFT functionals have been shown to remove the near-continuum of
spurious charge-transfer excited states that appear in large-scale TDDFT
calculations.
686
J. Phys. Chem. B
(2008),
112,
pp. 6304.
Link
However, certain results depend sensitively upon
the value of the range-separation parameter
,
686
J. Phys. Chem. B
(2008),
112,
pp. 6304.
Link
,
1061
J. Chem. Phys.
(2008),
129,
pp. 034107.
Link
,
1062
J. Chem. Phys.
(2009),
130,
pp. 054112.
Link
,
681
J. Am. Chem. Soc.
(2009),
131,
pp. 124115.
Link
,
1241
J. Phys. Chem. A
(2014),
118,
pp. 7507.
Link
especially in TDDFT calculations (Section 7.3) and therefore the
results of LRC-DFT calculations must therefore be interpreted with caution, and
probably for a range of values. This can be accomplished by
requesting a functional that contains some short-range GGA exchange functional
(PBE or PBE, in the examples mentioned above), in combination with
setting the $rem variable LRC_DFT = TRUE, which requests
the addition of 100% Hartree-Fock exchange in the long-range. Basic
job-control variables and an example can be found below. The value of the
range-separation parameter is then controlled by the variable OMEGA,
as shown in the examples below.
LRC_DFT
LRC_DFT
Controls the application of long-range-corrected DFT
TYPE:
LOGICAL
DEFAULT:
FALSE
OPTIONS:
FALSE (or 0)
Do not apply long-range correction.
TRUE (or 1)
Add 100% long-range Hartree-Fock exchange to the requested functional.
RECOMMENDATION:
The $rem variable OMEGA must also be specified, in order to set
the range-separation parameter.
OMEGA
OMEGA
Sets the range-separation parameter, , also known as , in functionals based on Hirao’s RSH scheme.
TYPE:
INTEGER
DEFAULT:
No default
OPTIONS:
Corresponding to , in units of bohr
RECOMMENDATION:
None
COMBINE_K
COMBINE_K
Controls separate or combined builds for short-range and long-range K
TYPE:
LOGICAL
DEFAULT:
FALSE
OPTIONS:
FALSE (or 0)
Build short-range and long-range K separately (twice as expensive as a global hybrid)
TRUE (or 1)
Build short-range and long-range K together ( as expensive as a global hybrid)
RECOMMENDATION:
Most pre-defined range-separated hybrid functionals in Q-Chem use this
feature by default. However, if a user-specified RSH is desired, it is
necessary to manually turn this feature on.
HFK_SR_COEF
HFK_SR_COEF
Sets the coefficient for short-range HF exchange
TYPE:
INTEGER
DEFAULT:
0
OPTIONS:
Corresponding to
RECOMMENDATION:
None
HFK_LR_COEF
HFK_LR_COEF
Sets the coefficient for long-range HF exchange
TYPE:
INTEGER
DEFAULT:
100000000
OPTIONS:
Corresponding to
RECOMMENDATION:
None
$comment The value of omega is 0.47 by default but can be overwritten by specifying OMEGA. $end $molecule -1 2 O 1.347338 -0.017773 -0.071860 H 1.824285 0.813088 0.117645 H 1.805176 -0.695567 0.461913 O -1.523051 -0.002159 -0.090765 H -0.544777 -0.024370 -0.165445 H -1.682218 0.174228 0.849364 $end $rem EXCHANGE LRC-BOP BASIS 6-311(1+,2+)G* XC_GRID 2 LRC_DFT TRUE OMEGA 300 ! = 0.300 bohr**(-1) $end
Rohrdanz et al.
1062
J. Chem. Phys.
(2009),
130,
pp. 054112.
Link
published a thorough benchmark study of
both ground- and excited-state properties using the LRC-PBEh
functional, in which the “h” indicates a short-range hybrid (i.e., the
presence of some short-range HF exchange). Empirically-optimized parameters of
(see Eq. (5.13)) and bohr were obtained,
1062
J. Chem. Phys.
(2009),
130,
pp. 054112.
Link
and these parameters are
taken as the defaults for LRC-PBEh. Caution is warranted, however,
especially in TDDFT calculations for large systems, as excitation energies for
states that exhibit charge-transfer character can be rather sensitive to the
precise value of .
681
J. Am. Chem. Soc.
(2009),
131,
pp. 124115.
Link
,
1062
J. Chem. Phys.
(2009),
130,
pp. 054112.
Link
In such cases (and
maybe in general), the “tuning” procedure described in
Section 5.6.4 is recommended.
$comment This example uses the "optimal" parameter set discussed above. It can also be run by setting METHOD = LRC-wPBEh. $end $molecule 0 1 C 0.670604 0.000000 0.000000 C -0.670604 0.000000 0.000000 H 1.249222 0.929447 0.000000 H 1.249222 -0.929447 0.000000 H -1.249222 0.929447 0.000000 H -1.249222 -0.929447 0.000000 C 0.669726 0.000000 5.000000 C -0.669726 0.000000 5.000000 F 1.401152 1.122634 5.000000 F 1.401152 -1.122634 5.000000 F -1.401152 -1.122634 5.000000 F -1.401152 1.122634 5.000000 $end $rem EXCHANGE GEN BASIS 6-31+G* LRC_DFT TRUE OMEGA 200 ! = 0.2 a.u. CIS_N_ROOTS 4 CIS_TRIPLETS FALSE $end $xc_functional C PBE 1.00 X wPBE 0.80 X HF 0.20 $end
By adding 100% Hartree-Fock exchange to the asymptotic Coulomb operator, LRC functionals
guarantee that an electron and hole experience an asymptotic interaction potential .
This is correct for a molecule in the gas phase, but to simulate a material one might desire an asymptotic
behavior of , where is the (static) dielectric constant of the material.
In conjunction with “optimal tuning” of the range-separation parameter, as described in Section 5.6.4,
such functionals have been shown to afford accurate fundamental gaps for organic photovoltaic
materials,
650
Adv. Mater.
(2018),
30,
pp. 1706560.
Link
and are naturally combined with polarizable continuum models
(Section 11.2.3)
that employ the same dielectric constant.
114
J. Chem. Theory Comput.
(2019),
14,
pp. 6287.
Link
These have come to be called screened RSH (sRSH) functionals.
650
Adv. Mater.
(2018),
30,
pp. 1706560.
Link
An XC function of this type can be expressed generically as
33
J. Phys. Chem. C
(2020),
124,
pp. 24653.
Link
(5.17) |
which should be compared to Eq. (5.13) that provides the generic form for an RSH functional.
Although the RSH formalism allows for an arbitrary coefficient for the long-range Hartree-Fock
exchange term, as in Eq. (5.13),
this implies that the asymptotic electron–hole interaction has the form rather than .
314
J. Chem. Phys.
(2003),
119,
pp. 2943.
Link
As such, LRC functionals are a particular class of RSH functionals where , ensuring proper
asymptotic behavior in vacuum. Along the same lines, sRSH functionals set
to ensure proper asymptotic behavior in a dielectric material. Using Eq. (5.17), users may construct
sRSH functionals by means of a $xc_functional input section.