ODDONLYGW: Difference between revisions

ODDONLYGW = [logical]
Default: ODDONLYGW = .FALSE. 

Description: ODDONLYGW allows to avoid the inclusion of the ${\displaystyle \Gamma }$ point in the evaluation of response functions (in GW calculations).

The independent particle polarizability ${\displaystyle \chi _{\mathbf {q} }^{0}({\mathbf {G} },{\mathbf {G} }',\omega )}$ is given by:

${\displaystyle \chi _{\mathbf {q} }^{0}({\mathbf {G} },{\mathbf {G} }',\omega )={\frac {1}{\Omega }}\sum _{n,n',{\mathbf {k} }}2w_{\mathbf {k} }(f_{n'{\mathbf {k} }+{\mathbf {q} }}-f_{n{\mathbf {k} }})\times {\frac {\langle \psi _{n{\mathbf {k} }}|e^{-i({\mathbf {q} }+{\mathbf {G} }){\mathbf {r} }}|\psi _{n'{\mathbf {k} }+{\mathbf {q} }}\rangle \langle \psi _{n'{\mathbf {k} }+{\mathbf {q} }}|e^{i({\mathbf {q} }+{\mathbf {G} }'){\mathbf {r'} }}|\psi _{n{\mathbf {k} }}\rangle }{\epsilon _{n'{\mathbf {k} }+{\mathbf {q} }}-\epsilon _{n{\mathbf {k} }}-\omega -i\eta }}}$

If the ${\displaystyle \Gamma }$ point is included in the summation over ${\displaystyle \mathbf {k} }$, convergence is very slow for some materials (e.g. GaAs).

To deal with this problem the flag ODDONLYGW has been included. In the automatic mode, the ${\displaystyle \mathbf {k} }$-grid is given by (see Sec. \ref{sec:autok}):

${\displaystyle {\vec {k}}={\vec {b}}_{1}{\frac {n_{1}}{N_{1}}}+{\vec {b}}_{2}{\frac {n_{2}}{N_{2}}}+{\vec {b}}_{3}{\frac {n_{3}}{N_{3}}},\qquad n_{1}=0...,N_{1}-1\quad n_{2}=0...,N_{2}-1\quad n_{3}=0...,N_{3}-1.}$

Related tags and articles

EVENONLYGW, GW calculations

Examples that use this tag