Moderators: Global Moderator, Moderator
Code: Select all
QP shifts evaluated in KS or natural orbital/ Bruckner basis
k-point 1 : 0.0000 0.0000 0.0000
band No. KS-energies sigma(KS) QP-e(linear) Z QP-e(zeros) Z occupation Imag(E_QP) QP_DIFF TAG
1 -7.1627 -8.6732 -8.2451 0.7166 -8.2346 0.7026 2.0000 -1.3101 0.0000 2
Hi,
Sorry, this is not yet described on the VASP Wiki in detail. Here is the description:
band No. > the band index enumerating the KS orbitals
KS-energies > the eigenenergies corresponding to the KS orbital computed within DFT E_nk0
sigma(KS) > diagonal matrix elements of the self-energy <psi_nk0|Sigma(w=Enk0)|psi_nk0>
QP-e(linear) > quasiparticle energies obtained by linearizing the diagonal elements of the real-frequency self-energy around the DFT energies E_nk0, See Eq 76 in P. Liu, M. Kaltak, J. Klimes, and G. Kresse, Phys. Rev. B 94, 165109 (2016).
Z (column 5) > renormalization factor obtained from five-point stencil for derivative of self-energy w.r.t. frequency
QP-e(zeros) > quasiparticle energies obtained by taking the real part of the roots of E{nk}^{QP} = <psi_nk|T+V{n-e}+V_H|psi_nk> + Sigma(w=E_{nk}^{QP})
Z (column 7) > renormalization factor obtained from central difference for derivative of self-energy w.r.t. frequency
occupation > occupation of KS orbital
Imag(E_QP) > Im[ E_{nk}^{QP} ]
QP_DIFF > difference of QP energies obtained by two methods for analytic continuation
TAG > Setting for the analytic continuation. TAG 1 is Thiele's method for Pade fitting. TAG 2 is a QR decomposition described in chapter 4 of Manuel Grumet's master thesis
Does this help?
Marie-Therese