Manu: saving work
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@ -361,7 +361,7 @@ where $\hHc(\br{}) = -\nabla^2/2 + \vne(\br{})$, and
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\end{equation}
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The ensemble density can be obtained directly (and exactly, if no
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approximation is made) from those orbitals:
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\beq
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\beq\label{eq:ens_KS_dens}
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\n{}{\bw}(\br{})=\sum_{I=0}^{\nEns-1} \ew{I}\left(\sum_{p}^{\nOrb}
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\ON{p}{(I)} [\MO{p}{\bw}(\br{})]^2\right),
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\eeq
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@ -482,7 +482,8 @@ is the Hxc potential, with
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\section{Computational details}
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\label{sec:compdet}
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The self-consistent GOK-DFT calculations have been performed in a restricted formalism with the \texttt{QuAcK} software, \cite{QuAcK} which is freely available on \texttt{github}, and where the present weight-dependent functionals have been implemented.
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The self-consistent GOK-DFT calculations \manuf{[see Eqs.~(\ref{eq:eKS})
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and (\ref{eq:ens_KS_dens})]} have been performed in a restricted formalism with the \texttt{QuAcK} software, \cite{QuAcK} which is freely available on \texttt{github}, and where the present weight-dependent functionals have been implemented.
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For more details about the self-consistent implementation of GOK-DFT, we refer the interested reader to Ref.~\onlinecite{Loos_2020} where additional technical details can be found.
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For all calculations, we use the aug-cc-pVXZ (X = D, T, Q, and 5) Dunning family of atomic basis sets. \cite{Dunning_1989,Kendall_1992,Woon_1994}
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Numerical quadratures are performed with the \texttt{numgrid} library \cite{numgrid} using 194 angular points (Lebedev grid) and a radial precision of $10^{-6}$. \cite{Becke_1988b,Lindh_2001}
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@ -490,7 +491,8 @@ This study deals only with spin-unpolarised systems, \ie, $\n{\uparrow}{} = \n{\
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Moreover, we restrict our study to the case of a two-state ensemble (\ie, $\nEns = 2$) where both the ground state ($I=0$ with weight $1 - \ew{}$) and the first doubly-excited state ($I=1$ with weight $\ew{}$) are considered.
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Although one should have $0 \le \ew{} \le 1/2$ to ensure the GOK variational principle, we will sometimes ``violate'' this variational constraint.
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Indeed, the limit $\ew{} = 1$ is of particular interest as it corresponds to a genuine saddle point of the KS equations, and match perfectly the results obtained with the maximum overlap method (MOM) developed by Gilbert, Gill and coworkers. \cite{Gilbert_2008,Barca_2018a,Barca_2018b}
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\manu{Maybe we should be more clear about what we mean with $\ew{} = 1$.
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In the range $1/2\leq \ew{}\leq 1$, }
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%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
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\section{Results}
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\label{sec:res}
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