Electron-phonon potential from supercells: Difference between revisions

Revision as of 15:08, 23 May 2024

The computation of the electron-phonon potential, $\partial_{\nu \mathbf{q}} V(\mathbf{r})$ , is a prerequisite for the calculation of the electron-phonon matrix element:

{\displaystyle g_{mn \mathbf{k}, \nu \mathbf{q}} \equiv \langle \psi_{m \mathbf{k} + \mathbf{q}} | \partial_{\nu \mathbf{q}} V | \psi_{n \mathbf{k}} \rangle . }

In the direct interpolation approach, $\partial_{\nu \mathbf{q}} V$ is computed from a supercell calculation by means of Fourier interpolation while the Bloch orbitals, $\psi_{n \mathbf{k}}(\mathbf{r})$ , are computed directly in the primitive cell. Naturally, this process involves multiple VASP calculations in different cells, which can introduce additional complexities compared to just a single execution of VASP. This page tries to give a high-level overview of the general workflow associated with electron-phonon calculations using the direct interpolation approach.

Finite displacements in the supercell

The electron-phonon potential is computed from finite atomic displacements in a sufficiently large supercell. In this case, sufficient means that the effects of an atomic displacement become negligible at about half the supercell size. Usually, converging the phonon frequencies is a good way of finding a supercell that is sufficiently large. Polar materials can exhibit long-range electrostatic interactions that go beyond reasonable supercell sizes. In this case, a correction scheme exists that explicitly treats the long-range dipole interactions and works with smaller cells. More information can be found on the theory page.

@@ Line 7: / Line 7: @@
 \partial_{\nu \mathbf{q}} V |
 \psi_{n \mathbf{k}}
-\rangle.
+\rangle
+.
 </math>
-In the [[missing|direct interpolation approach]], <math>\partial_{\nu \mathbf{q}} V(\mathbf{r})</math> is computed from a supercell calculation by means of Fourier interpolation while the Bloch orbitals, <math>\psi_{n \mathbf{k}}(\mathbf{r})</math>, are computed directly in the primitive cell.
+In the [[missing|direct interpolation approach]], <math>\partial_{\nu \mathbf{q}} V</math> is computed from a supercell calculation by means of Fourier interpolation while the Bloch orbitals, <math>\psi_{n \mathbf{k}}(\mathbf{r})</math>, are computed directly in the primitive cell.
 Naturally, this process involves multiple VASP calculations in different cells, which can introduce additional complexities compared to just a single execution of VASP.
 This page tries to give a high-level overview of the general workflow associated with electron-phonon calculations using the [[missing|direct interpolation approach]].
@@ Line 15: / Line 16: @@
 == Finite displacements in the supercell ==
-The electron-phonon potential, <math>\partial_{\nu \mathbf{q}} V(\mathbf{r})</math>, is computed from finite atomic displacements in a sufficiently large supercell.
+The electron-phonon potential is computed from finite atomic displacements in a sufficiently large supercell.
 In this case, sufficient means that the effects of an atomic displacement become negligible at about half the supercell size.
-For materials with long-range electrostatic interactions that go beyond reasonable supercell dimensions, a [[missing|correction scheme]] exists.
+Usually, converging the phonon frequencies is a good way of finding a supercell that is sufficiently large.
+Polar materials can exhibit long-range electrostatic interactions that go beyond reasonable supercell sizes.
+In this case, a [[missing|correction scheme]] exists that explicitly treats the long-range dipole interactions and works with smaller cells.
+More information can be found on the [[missing|theory page]].