Category:Van der Waals functionals: Difference between revisions

Revision as of 20:14, 10 March 2022

Theoretical background

The semilocal and hybrid functionals do not include the London dispersion forces, therefore they can not be applied reliably on systems where the London dispersion forces play an important role. To account more properly of the London dispersion forces in DFT, a correlation dispersion term can be added to the semilocal or hybrid functional:

E_{\text{xc}}=E_{\text{xc}}^{\text{SL/hybrid}}+E_{\text{c,disp}}.

There are essentially two types of dispersion terms $E_{\text{c,disp}}$ that have been proposed in the literature. The first type consists of a sum over the atom pairs $A$ - $B$ :

E_{\text{c,disp}}=-\sum _{A<B}\sum _{n=6,8,10,\ldots }f_{n}^{\text{damp}}(R_{AB}){\frac {C_{n}^{AB}}{R_{AB}^{n}}},

where $C_{n}^{AB}$ are the dispersion coefficients, $R_{AB}$ is the distance between atoms $A$ and $B$ and $f_{n}^{\text{damp}}$ is a damping function. Many variants of such atom-pair corrections exist and the most popular of them are available in VASP (see list below).

The other type of dispersion correction is of the following type:

E_{\text{c,disp}}^{\text{NL}}={\frac {1}{2}}\int \int \rho ({\textbf {r}})\Phi \left({\textbf {r}},{\textbf {r}}'\right)\rho ({\textbf {r}}')d^{3}rd^{3}r',

which requires a double spatial integration. The kernel $\Phi$ depends on the electron density $\rho$ , it's derivative $\nabla \rho$ as well as on $\left\vert {\bf {{r}_{1}-{\bf {{r}_{2}}}}}\right\vert$ .

How to

Main tag for van der Waals algorithm: IVDW
DFT-D2 method.
DFT-D3 method.
DDsC dispersion correction.
Many-body dispersion energy.
Tkatchenko-Scheffler method.
Tkatchenko-Scheffler method with iterative Hirshfeld partitioning.
Self-consistent screening in Tkatchenko-Scheffler method.
VdW-DF functional of Langreth and Lundqvist et al.

Pages in category "Van der Waals functionals"

The following 57 pages are in this category, out of 57 total.

D

G

GAMMA VDW

H

HITOLER

I

IVDW
IVDW NL

M

N

Nonlocal vdW-DF functionals

P

S

T

V

Z

ZAB VDW

@@ Line 17: / Line 17: @@
 d^{3}rd^{3}r',
 </math>
-which requires a double spatial integration. The kernel <math>\Phi</math> depends on the electron density <math>\rho</math>, it's derivative <math>\nabla\rho</math> as well as on <math>\left\vert\bm{r}_{1}-\bm{r}_{2}\right\vert</math>.
+which requires a double spatial integration. The kernel <math>\Phi</math> depends on the electron density <math>\rho</math>, it's derivative <math>\nabla\rho</math> as well as on <math>\left\vert\bf{r}_{1}-\bf{r}_{2}\right\vert</math>.