DDsC dispersion correction: Difference between revisions

From VASP Wiki
(Created page with "The expression for dispersion energy within thedDsC dispersion correction~\cite{Steinmann:11a,Steinmann:11b} (DFT-dDsC) is very similar to that of DFT-D2 method (see eq.~\ref{...")
 
No edit summary
 
(37 intermediate revisions by 3 users not shown)
Line 1: Line 1:
The expression for dispersion energy within thedDsC dispersion correction~\cite{Steinmann:11a,Steinmann:11b} (DFT-dDsC) is
The expression for the density-dependent energy correction dDsC{{cite|steinmann:jcp:11}}{{cite|steinmann:jctc:11}} is very similar to that of the {{TAG|DFT-D2}} method (see the equation for <math>E_{disp}</math> for the {{TAG|DFT-D2}} method). The important difference is, however, that the dispersion coefficients and damping function are charge-density dependent. The dDsC method is therefore able to take into account variations in the vdW contributions of atoms due to their local chemical environment. In this method, polarizability, dispersion coefficients, charge and charge-overlap of an atom in a molecule or solid are computed in the basis of a simplified exchange-hole dipole moment formalism{{cite|steinmann:jcp:11}} pioneered by Becke and Johnson{{cite|becke:jcp:05}}.
very similar to that of DFT-D2 method (see eq.~\ref{eq:VDWenergy}),
the important difference is, however, that the dispersion coefficients
and damping function are charge-density dependent. The dDsC method
is therefore able to take into account variations in vdW contributions
of atoms due to their local chemical environment.
In this method, polarizability, dispersion coeficients, charge
and charge-overlap of an atom in molecule or solid are computed
in the basis of a simplified exchange-hole dipole
moment formalism,\cite{Steinmann:11a} pioneered by Becke and Johnson\cite{Becke:05}.


The dDsC dispersion energy is expressed as follows
The dDsC dispersion energy is expressed as follows:
\begin{equation}
 
%{{E}_{\mathrm{disp}}}=-\sum\limits_{i=2}^{{{N}_\mathrm{at}}}{\sum\limits_{j=1}^{i-1}\sum\limits_{n=3}^{n=5}{{{f}_{2n}}(b{{R}_{ij}})\frac{C_{2n}^{ij}}{R_{ij}^{2n}}}}
:<math>{{E}_{\mathrm{disp}}}=-\sum\limits_{i=2}^{{{N}_\mathrm{at}}}{\sum\limits_{j=1}^{i-1}\sum\limits_{n=3}^{n=5}{{{f}_{2n}}(b{{R}_{ij}})\frac{C_{2n}^{ij}}{R_{ij}^{2n}}}}
{{E}_{\mathrm{disp}}}=-\sum\limits_{i=2}^{{{N}_{\mathrm{at}}}}{\sum\limits_{j=1}^{i-1}
{{E}_{\mathrm{disp}}}=-\sum\limits_{i=2}^{{{N}_{\mathrm{at}}}}{\sum\limits_{j=1}^{i-1}
{{{f}_{6}}(b{{R}_{ij}})\frac{C_{6,ij}}{R_{ij}^{6}}}}
{{{f}_{6}}(b{{R}_{ij}})\frac{C_{6,ij}}{R_{ij}^{6}}}} </math>
\label{eqn:dDsC}
 
\end{equation}
where <math>N_{\mathrm{at}}</math> is the number of atoms in the system and <math>b</math> is the Tang and Toennies (TT) damping factor. The damping function <math>f_{6}(bR_{ij})</math> is defined as follows:
where $N_{\mathrm{at}}$ is the number of atoms in the system and $b$ is the
 
Tang and Toennies (TT) damping factor.
:<math>f_{6}(x)=1-\exp(-x)\sum^{6}_{k=0}\frac{x^k}{k!}</math>
The damping function $f_{6}(bR_{ij})$ is defined as follows
 
\begin{equation}
and its role is to attenuate the correction at short internuclear distances. A key component of the dDsC method is the damping factor <math>b</math>:
f_{6}(x)=1-\exp(-x)\sum^{6}_{k=0}\frac{x^k}{k!}
 
\end{equation}
:<math>b(x)=\frac{2 b_{ij,\mathrm{asym}}}{{{e}^{{{a}_{0}}\cdot x}}+1} </math>
and its role is to attenuate the correction at short internuclear
 
distances.
where the fitted parameter <math>a_{0}</math> controls the short-range behaviour and <math>x</math> is the damping argument for the TT-damping factor associated with two separated atoms (<math>b_{ij,\mathrm{asym}}</math>).
A key component of the dDsC method is the damping factor $b$:
The term <math>b_{ij,\mathrm{asym}}</math> is computed according to the combination rule:
\begin{equation}
 
%b(x)=F(x)b_{ij,\mathrm{asym}},
:<math>b_{ij,\mathrm{asym}}=2\frac{b_{ii,\mathrm{asym}}\cdot b_{jj,\mathrm{asym}}}{b_{ii,\mathrm{asym}} + b_{jj,\mathrm{asym}}} </math>
b(x)=\frac{2 b_{ij,\mathrm{asym}}}{{{e}^{{{a}_{0}}\cdot x}}+1} ,
 
\end{equation}
with <math>b_{ii,\mathrm{asym}}</math> being estimated from  effective atomic polarizabilities:
where the fitted parameter $a_0$ controls the short-range behavior
 
and
:<math>{b}_{ii,\mathrm{asym}}={b}_{0}\cdot \sqrt[3]{\frac{1}{\alpha_{i}}}</math>
$x$ is the damping argument for
 
the TT-damping factor associated with two separated atoms ($b_{ij,\mathrm{asym}}$).
The effective atom-in-molecule polarizabilities <math>\alpha_{i}</math> are computed from the tabulated free-atomic polarizabilities (available for the elements of the first six rows of the periodic table except of lanthanides) in the same way as in the {{TAG|Tkatchenko-Scheffler method}} and {{TAG|Tkatchenko-Scheffler method with iterative Hirshfeld partitioning}}, but the Hirshfeld-dominant instead of the conventional Hirshfeld partitioning is used.
The term
The last element of the correction is the damping argument <math>x</math>:
$b_{ij,\mathrm{asym}}$ is computed according to the combination rule:
 
\begin{equation}
:<math>x=\left( 2{{q}_{ij}}+\frac{|({{Z}_{i}}-N_{i}^{D})\cdot ({{Z}_{j}}-N_{j}^{D})|}{{{r}_{ij}}} \right)\frac{N_{i}^{D}+N_{j}^{D}}{N_{i}^{D}\cdot N_{j}^{D}}</math>
b_{ij,\mathrm{asym}}=2\frac{b_{ii,\mathrm{asym}}\cdot b_{jj,\mathrm{asym}}}{b_{ii,\mathrm{asym}} + b_{jj,\mathrm{asym}}}
 
\end{equation}
where <math>Z_i</math> and <math>N_i^D</math> are the nuclear charge and Hirshfeld dominant population of atom <math>i</math>, respectively.
with $b_{ii,\mathrm{asym}}$ being estimated from  effective atomic polarizabilities:
The term <math>2q_{ij} = q_{ij} + q_{ji}</math> is a covalent bond index based on the overlap of conventional Hirshfeld populations <math>q_{ij}=\int w_i({\mathbf{r}})w_j({\mathbf{r}})n({\mathbf{r}})d{\mathbf{r}}</math>, and the fractional term in the parentheses is a distance-dependent ionic bond index.
\begin{equation}
 
{{b}_{ii,\mathrm{asym}}}={{b}_{0}}\cdot \sqrt[3]{\frac{1}{{{\alpha }_{i}}}}
The dDsC correction is invoked by setting {{TAG|IVDW}}=4. The default values for damping function parameters are available for the functionals PBE ({{TAG|GGA}}=''PE''}) and revPBE ({{TAG|GGA}}=''RE''). If another functional is used, the user has to define these parameters via corresponding tags in the {{TAG|INCAR}} file (parameters for common DFT functionals can be found in reference {{cite|steinmann:jctc:11}}. The following parameters can be optionally defined in the {{TAG|INCAR}} file (the given values are the default ones):
\end{equation}
*{{TAG|VDW_RADIUS}}=50.0 : cutoff radius (in <math>\AA</math>) for pair interactions
The effective atom-in-molecule polarizabilities ${\alpha }_{i}$ are
*{{TAG|VDW_S6}}=13.96 : scaling factor <math>{a}_{0}</math>
computed from the tabulated free-atomic polarizabilities (available for the
*{{TAG|VDW_SR}}=1.32 : scaling factor <math>{b}_{0}</math>
elements of the first six
 
rows of the periodic table except of lanthanides) in the same way as in the method
The Performance of PBE-dDsC in the description of the adsorption of hydrocarbons on Pt(111) has been examined in reference {{cite|gautier:pccp:15}}.
of Tkatchenko and Scheffler (see Sec.~\ref{sec:vdwTS})
but the Hirshfeld-dominant instead of the conventional Hirshfeld partitioning is used.
The last element of the correction is the damping argument $x$
\


\begin{equation}
{{NB|mind|
x=\left( 2{{q}_{ij}}+\frac{|({{Z}_{i}}-N_{i}^{D})\cdot ({{Z}_{j}}-N_{j}^{D})|}{{{r}_{ij}}} \right)\frac{N_{i}^{D}+N_{j}^{D}}{N_{i}^{D}\cdot N_{j}^{D}}
*The dDsC method has been implemented into VASP by Stephan N. Steinmann.
\label{eqn:dDsCx}
*This method requires the use of {{TAG|POTCAR}} files from the PAW dataset version 52 or later.
\end{equation}
*The input reference polarizabilities for non-interacting atoms are available only for elements of the first six rows of periodic table except of the lanthanides.
where $Z_i$ and $N_i^D$ are the nuclear charge and Hirshfeld dominant population of atom $i$, respectively.
*It is essential that a sufficiently dense FFT grid (controlled via {{TAG|NGXF}}, {{TAG|NGYF}} and {{TAG|NGZF}}) is used when using dDsC, especially for accurate gradients. We strongly recommend to use {{TAG|PREC}}{{=}}''Accurate'' for this type of calculations (in any case, avoid using {{TAG|PREC}}{{=}}''Low'').
The term $2q_{ij} = q_{ij} + q_{ji}$ is a covalent bond index based on the overlap of conventional
*The charge-density dependence of gradients is neglected. This approximation has been thoroughly investigated and validated in reference {{cite|bremond:jcp:14}}.}}
Hirshfeld populations $q_{ij}=\int w_i({\mathbf{r}})w_j({\mathbf{r}})\rho({\mathbf{r}})d{\mathbf{r}}$,
and the fractional term in the parentheses is a distance-dependent ionic bond index.


\noindent The DFT-dDsC calculation is invoked by setting {\tt IVDW}=4.
== Related tags and articles ==
The default values for damping function parameters are available for
{{TAG|VDW_RADIUS}},
the  functionals
{{TAG|VDW_S6}},
PBE ({\tt GGA=PE}) and revPBE ({\tt GGA=RP}).
{{TAG|VDW_SR}},
If other functional is used, the user must
{{TAG|IVDW}}
define these parameters via corresponding tags in
INCAR (parameters for common DFT functionals can be found in Ref.~\cite{Steinmann:11b})
The following parameters can be optionally defined in {\tt INCAR}:\\
\begin{tabular}{rll}
{\tt VDW\_RADIUS} &= 50.0      & cutoff radius ({\AA}) for pair interactions\\
{\tt VDW\_S6} &= 13.96    & scaling factor ${a}_{0}$\\
{\tt VDW\_SR} &= 1.32      & scaling factor ${b}_{0}$\\
\end{tabular}
\hspace{5mm}


\noindent Performance of PBE-dDsC in description of the adsorption of
== References ==
hydrocarbons on Pt(111)
<references/>
has been examined in Ref.~\cite{Gautier:15} PCCP 17, 28921 (2015).\\


\noindent IMPORTANT NOTES:
----
\begin{itemize}
[[Category:Exchange-correlation functionals]][[Category:van der Waals functionals]][[Category:Theory]]
\item
the dDsC method has been implemented into VASP by Stephan N. Steinmann
\item
this method requires the use of POTCAR files from the
PAW dataset version 52 or later
\item
the input reference
polarizabilities for non-interacting atoms are available only for elements
of the first six rows of periodic table except of lanthanides
\item
it is essential that a sufficiently dense FFT grid (controlled via {\tt NGFX(Y,Z)}) is
used in the DFT-dDsC, especially for accurate gradients - we strongly recommend
to use {\tt PREC=Accurate} for this type of calculations
(in any case, avoid using {\tt PREC=Low}).
\item
the charge-density dependence of gradients is neglected.
This approximation has been thoroughly
investigated and validated.\cite{Bremond:14}
\end{itemize}

Latest revision as of 14:55, 12 October 2023

The expression for the density-dependent energy correction dDsC[1][2] is very similar to that of the DFT-D2 method (see the equation for for the DFT-D2 method). The important difference is, however, that the dispersion coefficients and damping function are charge-density dependent. The dDsC method is therefore able to take into account variations in the vdW contributions of atoms due to their local chemical environment. In this method, polarizability, dispersion coefficients, charge and charge-overlap of an atom in a molecule or solid are computed in the basis of a simplified exchange-hole dipole moment formalism[1] pioneered by Becke and Johnson[3].

The dDsC dispersion energy is expressed as follows:

where is the number of atoms in the system and is the Tang and Toennies (TT) damping factor. The damping function is defined as follows:

and its role is to attenuate the correction at short internuclear distances. A key component of the dDsC method is the damping factor :

where the fitted parameter controls the short-range behaviour and is the damping argument for the TT-damping factor associated with two separated atoms (). The term is computed according to the combination rule:

with being estimated from effective atomic polarizabilities:

The effective atom-in-molecule polarizabilities are computed from the tabulated free-atomic polarizabilities (available for the elements of the first six rows of the periodic table except of lanthanides) in the same way as in the Tkatchenko-Scheffler method and Tkatchenko-Scheffler method with iterative Hirshfeld partitioning, but the Hirshfeld-dominant instead of the conventional Hirshfeld partitioning is used. The last element of the correction is the damping argument :

where and are the nuclear charge and Hirshfeld dominant population of atom , respectively. The term is a covalent bond index based on the overlap of conventional Hirshfeld populations , and the fractional term in the parentheses is a distance-dependent ionic bond index.

The dDsC correction is invoked by setting IVDW=4. The default values for damping function parameters are available for the functionals PBE (GGA=PE}) and revPBE (GGA=RE). If another functional is used, the user has to define these parameters via corresponding tags in the INCAR file (parameters for common DFT functionals can be found in reference [2]. The following parameters can be optionally defined in the INCAR file (the given values are the default ones):

  • VDW_RADIUS=50.0 : cutoff radius (in ) for pair interactions
  • VDW_S6=13.96 : scaling factor
  • VDW_SR=1.32 : scaling factor

The Performance of PBE-dDsC in the description of the adsorption of hydrocarbons on Pt(111) has been examined in reference [4].


Mind:
  • The dDsC method has been implemented into VASP by Stephan N. Steinmann.
  • This method requires the use of POTCAR files from the PAW dataset version 52 or later.
  • The input reference polarizabilities for non-interacting atoms are available only for elements of the first six rows of periodic table except of the lanthanides.
  • It is essential that a sufficiently dense FFT grid (controlled via NGXF, NGYF and NGZF) is used when using dDsC, especially for accurate gradients. We strongly recommend to use PREC=Accurate for this type of calculations (in any case, avoid using PREC=Low).
  • The charge-density dependence of gradients is neglected. This approximation has been thoroughly investigated and validated in reference [5].

Related tags and articles

VDW_RADIUS, VDW_S6, VDW_SR, IVDW

References