Category:Bethe-Salpeter equations: Difference between revisions
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==Lanczos algorithm== | ==Lanczos algorithm== | ||
The expression for the dielectric function can be re-written as a continued fraction | The expression for the dielectric function can be re-written as a continued fraction | ||
::<math> | ::<math> | ||
\epsilon_{\alpha\beta}(\omega) = \delta_{\alpha\beta} - \frac{4\pi}{\Omega}\cfrac{|u_0|^2}{(\omega - a_1 + \mathrm i\eta) - \cfrac{b_1^2}{(\omega -a_2 + \mathrm i\eta) | \epsilon_{\alpha\beta}(\omega) = \delta_{\alpha\beta} - \frac{4\pi}{\Omega}\cfrac{|u_0|^2}{(\omega - a_1 + \mathrm i\eta) - \cfrac{b_1^2}{(\omega -a_2 + \mathrm i\eta) | ||
- \cfrac{b_2^2}{...}}}, | - \cfrac{b_2^2}{...}}}, | ||
</math> | </math> | ||
where <math>|u_0\rangle</math> is | where <math>|u_0\rangle</math> is an initial guess vector computed from the dipole moments, <math>|u_0\rangle = \sum_{cv\mathbf{k}} \langle c\mathbf{k}|r_\alpha|v\mathbf{k}\rangle \langle v\mathbf{k}|r_\beta|c\mathbf{k}\rangle</math>. The <math>a</math> and <math>b</math> coefficients are evaluated iteratively, with the iterative algorithm stopping once the difference between <math>\epsilon(\omega)</math> from two consecutive iterations is below a certain threshold, set by {{TAG|LANCZOSTHR}} in the {{TAG|INCAR}}. By default, {{TAG|LANCZOSTHR}}=<math>10^{-3}</math>. | ||
Using the dipole moments as the starting point means that the iterative algorithm is sensitive only to optically active transitions, i.e. <math>v\to c</math> transitions with non-zero dipole moment. This means that the Lanczos algorithm can ignore optically inactive transitions and will reach spectral convergence faster than other methods for larger matrices. | |||
The following features are currently supported: | The following features are currently supported: | ||
* Calculating the dielectric function | * Calculating the dielectric function | ||
* Calculating the eigenvalues of bright excitonic states | * Calculating the eigenvalues of bright excitonic states | ||
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expression with the u_0 vector explicitly written | expression with the u_0 vector explicitly written | ||
<math\delta_{\alpha\beta} - \frac{4\pi}{\Omega}\sum_{cv\mathbf{k}} \langle|c\mathbf{k}|r_\alpha|v\mathbf{k}\rangle | <math\delta_{\alpha\beta} - \frac{4\pi}{\Omega}\sum_{cv\mathbf{k}} \langle|c\mathbf{k}|r_\alpha|v\mathbf{k}\rangle | ||
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\cfrac{1}{(\omega - a_1 + \mathrm i\eta) - \cfrac{b_1^2}{(\omega -a_2 + \mathrm i\eta) - \cfrac{b_2^2}{...}}} | \cfrac{1}{(\omega - a_1 + \mathrm i\eta) - \cfrac{b_1^2}{(\omega -a_2 + \mathrm i\eta) - \cfrac{b_2^2}{...}}} | ||
</math> | </math> | ||
-> | |||
== How to == | == How to == |
Revision as of 12:18, 15 October 2024
The formalism of the Bethe-Salpeter equation (BSE) allows for calculating the polarizability with the electron-hole interaction and constitutes the state of the art for calculating absorption spectra in solids.
Theory
Bethe-Salpeter equation
In the BSE, the excitation energies correspond to the eigenvalues of the following linear problem[1]
The matrices and describe the resonant and anti-resonant transitions between the occupied and unoccupied states
The energies and orbitals of these states are usually obtained in a calculation, but DFT and Hybrid functional calculations can be used as well. The electron-electron interaction and electron-hole interaction are described via the bare Coulomb and the screened potential .
The coupling between resonant and anti-resonant terms is described via terms and
Due to the presence of this coupling, the Bethe-Salpeter Hamiltonian is non-Hermitian.
Tamm-Dancoff approximation
A common approximation to the BSE is the Tamm-Dancoff approximation (TDA), which neglects the coupling between resonant and anti-resonant terms, i.e., and . Hence, the TDA reduces the BSE to a Hermitian problem
In reciprocal space, the matrix is written as
where is the cell volume, is the bare Coulomb potential without the long-range part
and the screened Coulomb potential
Here, the dielectric function describes the screening in within the random-phase approximation (RPA)
Although the dielectric function is frequency-dependent, the static approximation is considered a standard for practical BSE calculations.
Scaling
The scaling of the BSE equation strongly limits its application for large systems. The main limiting factor is the diagonalization of the BSE Hamiltonian. The rank of the Hamiltonian is
- ,
where is the number of k-points in the Brillouin zone and and are the number of conduction and valence bands, respectively. The diagonalization of the matrix scales cubically with the matrix rank, i.e., .
Despite the fact that this matrix diagonalization is usually the bottleneck for bigger systems, the construction of the BSE Hamiltonian also scales unfavorably and can play a dominant role in big systems, i.e.,
- ,
where is the number of q-points and number of G-vectors.
Exact diagonalization
The diagonalization of the BSE Hamiltonian can be perform using various eigensolvers provided in ScaLAPACK, ELPA, and cuSolver libraries. The advantage of this approach is that the eigenvectors can be directly obtained and used for the analysis of the excitons. Using the eigenvalues and eigenvectors of the BSE Hamiltonian, the macroscopic dielectric which accounts for the excitonic effects can be found
The following features are currently supported:
- Calculating the dielectric function and eigenvectors
- Calculations beyond Tamm-Dancoff approximation
- Calculations of for
- Fatband plot
Time evolution
Alternatively, it is possible to use the time-evolution algorithm which applies a short Dirac delta pulse of electric field and then follows the evolution of the dipole moments. The dielectric function is found via a Fourier transform [2]
- ,
where and are the dipole moments.
The solution found this way is strictly equivalent to the same solution as the exact diagonalization and can be used for obtaining the absorption spectrum, but does not yield the eigenvectors, which can be limiting for the analysis of the excitons. The advantage of this approach is the quadratic scaling with the size of the BSE Hamiltonian .
The time-evolution algorithm can be selected by setting IBSE = 1 in a BSE calculation. The required number of steps in the time-evolution calculation depends on the broadening CSHIFT and the maximum energy OMEGAMAX. The precision can be selected via tag BSEPREC.
Mind: The required number of steps does not depend on the size of the Hamiltonian |
The following features are currently supported:
- Calculating the dielectric function
- Calculations beyond the Tamm-Dancoff approximation
- ↑ T. Sander, E. Maggio, and G. Kresse, Beyond the Tamm-Dancoff approximation for extended systems using exact diagonalization, Phys. Rev. B 92, 045209 (2015).
- ↑ T. Sander, G. Kresse, Macroscopic dielectric function within time-dependent density functional theory—Real time evolution versus the Casida approach , J. Chem. Phys. 146, 064110 (2017)
Pages in category "Bethe-Salpeter equations"
The following 24 pages are in this category, out of 24 total.