LSCDM: Difference between revisions

Latest revision as of 10:20, 7 February 2024

LSCDM = .TRUE. | .FALSE.

Default: LSCDM

= .FALSE.

Description: LSCDM switches on the selected columns of the density matrix (SCDM) method.

The selected columns of the density matrix (SCDM) method works by fitting a unitary matrix $U_{mn\mathbf{k}}$ that transforms the basis from Bloch states $|\psi_{n\mathbf{k}}\rangle$ obtained by VASP to a Wannier basis $|w_{m\mathbf{R}}\rangle$ .

{\displaystyle |w_{m\mathbf{R}}\rangle = \sum_{n\mathbf{k}} e^{-i\mathbf{k}\cdot\mathbf{R}} U_{mn\mathbf{k}} |\psi_{n\mathbf{k}}\rangle. }

This is done using a one-shot method through a singular-value decomposition as proposed by A. Damle and L. Lin ^[1].

In order to obtain a good Wannierization, a certain level of freedom should be given to the localized orbitals to adequately accommodate the Bloch states. This is controlled by the cutoff function specified by the CUTOFF_TYPE tag and related parameters $\mu$ (CUTOFF_MU) and $\sigma$ (CUTOFF_SIGMA).

References

↑ A. Damle and L. Lin, Multiscale Model. Simul., 16(3), 1392–1410 (2018).

[damle:mms:2018-1] A. Damle and L. Lin, Multiscale Model. Simul., 16(3), 1392–1410 (2018).

[1]

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 </math>
-This is done using a [[Wannier_Functions#One-shot_single_value_decomposition (SVD) | one-shot method ]] through a singular-value decomposition as proposed by A. Dale and L. Lin {{cite|dale:mms:2018}}.
+This is done using a [[Wannier_Functions#One-shot_single_value_decomposition (SVD) | one-shot method ]] through a singular-value decomposition as proposed by A. Damle and L. Lin {{cite|damle:mms:2018}}.
 In order to obtain a good Wannierization, a certain level of freedom should be given to the localized orbitals to adequately accommodate the Bloch states. This is controlled by the cutoff function specified by the {{TAG|CUTOFF_TYPE}} tag and related parameters

Latest revision as of 10:20, 7 February 2024

Related tags and articles

References