minor corrections in SI

This commit is contained in:
Pierre-Francois Loos 2019-12-17 13:56:01 +01:00
parent 8902ebfea6
commit f65b865e57

View File

@ -215,7 +215,7 @@ with
\begin{equation}
\be{\text{c,md}}{\srLDA}(\n{}{},\rsmu{}{}) = \be{\text{c}}{\srLDA}(\n{}{},\rsmu{}{}) + \Delta^{\text{lr-sr}}(n,\mu),
\end{equation}
with $\be{\text{c,md}}{\srLDA}(\n{}{},\rsmu{}{})$ is the complementary short-range LDA correlation energy functional (with single-determinant reference) and $\Delta^{\text{lr-sr}}(n,\mu)$ is a mixed long-range/short-range contribution, both parametrized in Ref.~\onlinecite{Paziani_2006}.
where $\be{\text{c,md}}{\srLDA}(\n{}{},\rsmu{}{})$ is the complementary short-range LDA correlation energy functional (with single-determinant reference) and $\Delta^{\text{lr-sr}}(n,\mu)$ is a mixed long-range/short-range contribution, both parametrized in Ref.~\onlinecite{Paziani_2006}.
The corresponding complementary srLDA potential is
\begin{eqnarray}
@ -243,7 +243,7 @@ with
\label{eq:def_epsipbeueg}
\epspbeueg(n,s,\mu) = \frac{\epspbe(n,s)}{1+\beta(n,s)\mu^3}.
\end{equation}
Here, $\epspbe(n,s)$ is the usual PBE correlation functional \cite{Perdew_1996}, $s$ is the reduced density gradient,
Here, $\epspbe(n,s)$ is the usual PBE correlation functional,\cite{Perdew_1996} $s$ is the reduced density gradient,
\begin{equation}
\beta(n,s) = \frac{3}{2\sqrt{\pi}(1-\sqrt{2})}\frac{\epspbe(n,s)}{n_2^{\text{UEG}}(n)/n},
\end{equation}
@ -321,7 +321,7 @@ with
\section{Additional graphs of the convergence of the IPs of the GW20 subset}
Graphs reporting the convergence of the IPs of each molecule of the GW20 subset at the {\GOWO}@{\HF} and {\GOWO}@{\PBEO} levels are given in Figure~\ref{fig:IP_G0W0HF} and~\ref{fig:IP_G0W0PBE0}, respectively.
Graphs reporting the convergence of the IPs of each molecule of the GW20 subset at the {\GOWO}@{\HF} and {\GOWO}@{\PBEO} levels are given in Figs.~\ref{fig:IP_G0W0HF} and~\ref{fig:IP_G0W0PBE0}, respectively.
\begin{figure*}
\includegraphics[width=\linewidth]{IP_G0W0HF}