Cut-off Coulomb

Author:: Nick Hine, University of Warwick (implementation)
Author:: Gabriel Bramley, University of Southampton (documentation)
Date:: July 2019

Theory

The plane wave approach inherently involves the use of periodic boundary conditions (PBC). In order to model isolated molecules, the supercell technique was developed, which involves adding large quantities of vacuum to the simualtion cell in order to separate their periodic images. Although this method is adequate for neutral molecules, charged systems and systems with significant multipoles require additional considerations. The potential of the monopole and multipole moments decay in accordance to the power law, where point charges decay with $\frac{1}{r^{1}}$, dipoles with $\frac{1}{r^{2}}$ etc.. Using the supercell method for systems with a net charge or significant dipoles require large volumes of vacuum to eliminate the electrostatic interactions between the system of the unit cell and its periodic images. However, as traditional plane wave codes extend across the entire cell, adding large quantities of vacuum is computationally costly. Various dipole corrections such as the cut-off Coulomb (CC) [Jarvis1997], Continuum Screening Method [Otani2006] and Gaussian Counter Charge model [Dabo2008] have been developed in order to isolate the electrostatic interactions of the unit cell from its periodic images.

The cut-off Coulomb (or Coulomb cut-off) approach, as implemented in ONETEP by Nick Hine [Hine2011], achieves this by only allowing Coulombic interactions within a specified region, thereby emulating the electrostatics of an isolated system with a periodic representation of the charge density [Jarvis1997]. By selecting an appropriate region, one can eliminate spurious electrostatic interactions between charges in the periodic replicas and the home cell, while also retaining the correct description of the potential between charges in the isolated system. One can choose to maintain periodic Coulombic interactions along specified axes, thereby representing electrostatics in systems with either 1D (wire), 2D (slab) or 0D (sphere) periodicity.

3D Periodic Coulomb Interaction

In a standard periodic calculation, the electrostatic potential is defined as through the Hartree potential:

(25)\[V_{H}(\mathbf{r}) = \int_{space} {\frac{n(\mathbf{r'})}{|\mathbf{r} - \mathbf{r'}|}} d\mathbf{r'}\]

Where $n(\mathbf{r'})$ describes the charge density of the system. This can be equivalently represented as:

\[V_{H}(\mathbf{r}) = \int_{space} v(\mathbf{r},\mathbf{r'})n(\mathbf{r'}) d\mathbf{r'}\]

Where $v(\mathbf{r})$ represents the Coulomb interaction, $\frac{1}{|\mathbf{r} - \mathbf{r'}|}$. This is more conveniently calculated in reciprocal space, which is achieved through a Fourier transformation of the $V_{H}$ in accordance with convolution theory:

\[V_{H}(\mathbf{G}) = v(\mathbf{G})n(\mathbf{G})\]

In the fully periodic case, the above expressions are taken over all reciprocal space ($\infty$ to $-\infty$), which yields a Coulomb interaction of:

\[v(\mathbf{G}) = \frac{4 \pi}{|\mathbf{G}|^2}\]

Coulomb Cut-off in 3D

The standard periodic approach takes the integration of the Coulomb interaction over all space, which allows interaction between the periodic images and the original unit cell. In contrast, Coulomb cut-off sets the Coulomb interaction between charges to zero beyond a specified radius. In the simplest case, one can define this cut-off as a sphere, which assumes a system without periodicity. By selecting an appropriate cut-off radius, $R_C$, one can retain the correct electrostatic interactions of between charges in the unit cell, while eliminating spurious interactions the periodic images:

\[\begin{split}v^{3D}(\mathbf{r},\mathbf{r'}) = \begin{cases} \frac{1}{|\mathbf{r} - \mathbf{r'}|} & \text{for $R_C < |\mathbf{r} - \mathbf{r'}|$}\\ 0 & \text{for $R_C > |\mathbf{r} - \mathbf{r'}|$}\\ \end{cases}\end{split}\]

Performing an analytic Fourier Transformation of $v(\mathbf{r},\mathbf{r'})$ with modified boundaries yields the following reciprocal space representation of the Coulomb interaction:

\[v^{3D}(\mathbf{G}) = \frac{4 \pi}{\mathbf{G}^2}(1 - \cos(\mathbf{G}R_C))\]

Coulomb Cut-off in 1D

Although this approach is satisfactory for systems with no periodicity, additional considerations must be made if periodicity is required in either 1D (ie. a wire) or in 2D (ie. an infinitely extended plane). In the 1D case, the Coulomb cut-off is defined as a cylinder, where periodicity is retained in the z-axis and the Coulomb interaction is applied in the xy-direction. In theory, this redefines the Coulomb interaction as:

(26)\[\begin{aligned} v^{1D}(\mathbf{G_{\bot}, G}_x) = \frac{4 \pi}{\mathbf{G}^2} [1 + \mathbf{G}_{\bot}R_C J_1 (\mathbf{G}_{\bot}R_C) K_{0}(\mathbf{G}_x R_C) - \mathbf{G}_x R_C J_{0}(\mathbf{G}_{\bot}R_C) K_{1}(\mathbf{G}_x R_C) ] \end{aligned}\]

Where $J$ and $K$ are modified Bessel functions, $\mathbf{G}_x$, $\mathbf{G}_y$ and $\mathbf{G}_z$ the reciprocal lattice vectors in $x$, $y$ and $z$ and $\mathbf{G}_{\bot} = \sqrt{\mathbf{G}_x^2 + \mathbf{G}_z^2}$.

However, a divergence occurs at $G_x = 0$, which is handled by re-casting Equation (26) into an analytical expression solved through :

\[v^{1D}(\mathbf{G_{\bot}, G}_x = 0) = - 4 \pi \int_{0}^{R} r J_{0}(\mathbf{G}_{\bot})\ln{(\mathbf{r})} d \mathbf{r}\]

Coulomb Cut-off in 2D

For systems where periodicity is maintained in 2D, the Coulomb cut-off must only be applied in the out-of-plane direction, while retaining PBC in the xy-plane. Originally, this was implemented in ONETEP from the formulation of Rozzi et al. [Rozzi2006], where the Coulomb interaction $v^{3D}(\mathbf{G})$ is re-cast to the following expression:

\[v^{2D}(\mathbf{G_{\|}},\mathbf{G}_{z}) = \frac{4 \pi}{\mathbf{G}^2} \bigg \lbrack 1 + e^{-\mathbf{G}_{\|}R_C}\frac{\mathbf{G}_z}{\mathbf{G}_{\|}}\sin(\mathbf{G}_z R_C) - e^{-\mathbf{G}_{\|}R_C}\cos{|\mathbf{G}_z|R_C}) \bigg \rbrack\]

Where $\mathbf{G}_{\|} = \sqrt{\mathbf{G}_{x}^2+\mathbf{G}_{y}^2}$ and $\mathbf{G}_{z}$ represent the in-plane and out-of-plane reciprocal space vectors respectively. However, as described by Sohier et al. [Sohier2017], if $R_C = \frac{L}{2}$, where L represents the length of the simulation cell, this expression simplifies to:

\[v^{2D}(\mathbf{\mathbf{G}_{\|}},\mathbf{G}_{z}) = \frac{4 \pi}{\mathbf{G}^2} \bigg \lbrack 1 - e^{-\mathbf{G}_{\|}R_C}\cos({|\mathbf{G}_z|R_C}) \bigg \rbrack\]

Where $G_z$ is a multiple of $\frac{2 \pi}{L}$. As with the Coulomb interaction under periodic boundary conditions, this term diverges at $\mathbf{G} = 0$, and is therefore treated separately and $v^{2D}(\mathbf{\mathbf{G}}=0) = 0$ as argued by Sohier et al. [Sohier2017].

Performing a Calculation with Coulomb Cut-off

To use Coulomb cut-off, the keyword COULOMB_CUTOFF_TYPE must be inserted, with the input specifying the periodicity of the system:

1D - COULOMB_CUTOFF_TYPE: WIRE
2D - COULOMB_CUTOFF_TYPE: SLAB
3D - COULOMB_CUTOFF_TYPE: SPHERE

In addition, the length/radius of the cut-off must be specified with either COULOMB_CUTOFF_RADIUS or COULOMB_CUTOFF_LENGTH:

1D & 2D - COULOMB_CUTOFF_LENGTH
3D - COULOMB_CUTOFF_RADIUS

As part of the Coulomb cut-off in ONETEP, the electron density $n(\mathbf{r})$ in the original cell is placed into a larger, padded cell in which $n(\mathbf{r}) = 0$. This is determined in a similar way as the original lattice block through a new block %BLOCK PADDED_LATTICE_CART, which determines the size and dimensions of the larger cell: %BLOCK PADDED_LATTICE_CART a11 a21 a31 a21 a22 a23 a31 a32 a33 %ENDBLOCK PADDED_LATTICE_CART

This is automatically specified, so adjusting this block is not recommended. The recommended set-ups for calculations of each dimensionality are summarized in the table below:

Coulomb Cut-off Type	Cut-off Length/Radius	Cell Dimensions
		$a_{11}^{pad} = 2a_{11}^{cell}$
Sphere*	$R_C = \sqrt{3}a_{33}^{cell}$	$a_{22}^{pad} = 2a_{22}^{cell}$
		$a_{33}^{pad} = 2a_{33}^{cell}$
		$a_{11}^{pad} = 2a_{11}^{cell}$
Wire**	$R_C = \sqrt{2}a_{33}^{cell}$	$a_{22}^{pad} = 2a_{22}^{cell}$
		$a_{33}^{pad} = a_{33}^{cell}$
		$a_{11}^{pad} = a_{11}^{cell}$
Slab***	$R_C = a_{33}$	$a_{22}^{pad} = a_{22}^{cell}$
		$a_{33}^{pad} = 2 a_{33}^{cell}$

Table: The recommended calculation parameters for each periodicity of the Coulomb cut-off, where $a_{ii}^{cell}$ and $a_{ii}^{pad}$ represent the diagonal components of the original simulation cell specified in % BLOCK_LATTICE_CART and the padded cell respectively. Assumed orthogonal cell in all cases.

* Assuming \(a_{11}^{cell} = a_{22}^{cell} = a_{33}^{cell}\).
** Assuming \(a_{11}^{cell} = a_{22}^{cell}\). \(a_{33}\) being the periodic direction.
*** \(a_{33}\) defined as the non-periodic direction.

These choices of both the padded cell dimension and the cut-off length/radius ensure two conditions are satisfied:

Charges within the original unit cell correctly interact with one another.
The interaction between charges of the periodic image and the original simulation cell are set to zero.

The first condition is satisfied by setting the cut-off distance equal to or greater than the distance between any two non-zero charges within the original unit cell. For the 3D case, this is typically satisfied by $R_C > \sqrt{3}L_{cell}$, while in 2D and 1D, this is satisfied by $R_C = \frac{L_{cell}}{2}$, where $L_{cell}$ is the cell dimension in the non-periodic axis. The second condition requires that the distance between non-zero charges of the simulation cell and the periodic image must be greater than or equal to the cut-off length. In ONETEP, this is achieved by placing the unit cell inside a larger padded cell, in which the charge density $\rho(\mathbf{r})=0$. The second condition is satisfied when the total cell length, $L_{total} = L_{cell} + L_{pad} \geq R_C + L_{cell}$.

[Jarvis1997] M. R. Jarvis, I. D. White, R. W. Godby, and M. C. Payne, Supercell technique for total-energy calculations of finite charged and polar systems, Phys. Rev. B, 56, (1997).

[Otani2006] M. Otani, and O. Sugino, First-principles calculations of charged surfaces and interfaces: A plane-wave nonrepeated slab approach, Phys. Rev. B, 73, (2006).

[Dabo2008] I. Dabo, B. Kozinsky, N. E. Singh-Miller, N. Marzari, Electrostatics in periodic boundary conditions and real-space corrections, Phys. Rev. B, 77, (2008).

[Hine2011] N. D. M. Hine, J. Dziedzic, P. D. Haynes, and C.-K. Skylaris, Electrostatic interactions in finite systems treated with periodic boundary conditions: Application to linear-scaling density functional theory, J. Chem. Phys. 135 (2011).

[Rozzi2006] C. A. Rozzi, D. Varsano, A. Marini, E. K. U. Gross, and A. Rubio, Exact Coulomb cutoff technique for supercell calculations, Phys. Rev. B 73 (2006).

[Sohier2017] T. Sohier, M. Calandra, and F. Mauri, Density functional perturbation theory for gated two-dimensional heterostructures: Theoretical developments and application to flexural phonons in graphene, Phys. Rev. B 96 (2017).

Coulomb Cut-off Type	Cut-off Length/Radius	Cell Dimensions
		\(a_{11}^{pad} = 2a_{11}^{cell}\)
Sphere*	\(R_C = \sqrt{3}a_{33}^{cell}\)	\(a_{22}^{pad} = 2a_{22}^{cell}\)
		\(a_{33}^{pad} = 2a_{33}^{cell}\)
		\(a_{11}^{pad} = 2a_{11}^{cell}\)
Wire**	\(R_C = \sqrt{2}a_{33}^{cell}\)	\(a_{22}^{pad} = 2a_{22}^{cell}\)
		\(a_{33}^{pad} = a_{33}^{cell}\)
		\(a_{11}^{pad} = a_{11}^{cell}\)
Slab***	\(R_C = a_{33}\)	\(a_{22}^{pad} = a_{22}^{cell}\)
		\(a_{33}^{pad} = 2 a_{33}^{cell}\)