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\begin{abstract}
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The many-body Green's function Bethe-Salpeter equation (BSE) formalism is steadily asserting itself as a new efficient and accurate tool in the armada of computational methods available to chemists in order to predict neutral electronic excitations in molecular systems.
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In particular, the combination of the so-called $GW$ approximation of many-body perturbation theory, giving access to reliable charged excitations and quasiparticle energies, and the Bethe-Salpeter formalism, able to catch excitonic effects, has shown to provide accurate excitation energies in many chemical scenarios with a typical error of $0.1$--$0.3$ eV.
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With a similar computational cost than time-dependent density-functional theory (TD-DFT), BSE@$GW$ is then able to provide an accuracy on par with the most accurate global hybrid functionals without the unsettling choice of the exchange-correlation functional.
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With a similar computational cost than time-dependent density-functional theory (TD-DFT), the BSE formalism is then able to provide an accuracy on par with the most accurate global \xavier{and range-separated} hybrid functionals without the unsettling choice of the exchange-correlation functional, \xavier{resolving further know issues (e.g. charge-transfer excitations) and offering a well-defined path to dynamical kernels.}
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In this \textit{Perspective} article, we provide a historical overview of the Bethe-Salpeter formalism, with a particular focus on its condensed-matter roots.
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We also propose a critical review of its strengths and weaknesses for different chemical situations.
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Future directions of developments and improvements are also discussed.
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@ -363,27 +363,27 @@ However, remaining a low order perturbative approach starting with single-determ
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\subsection{Neutral excitations}
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%===================================
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While TD-DFT starts with the variation of the charge density $\rho(1)$ with respect to an external local perturbation $U(1)$, the BSE formalism considers a generalized 4-points susceptibility that monitors the variation of the two-body Green's function $G(1,2)$ with respect to a non-local external perturbation $U(1,2)$:
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While TD-DFT starts with the variation of the charge density $\rho(1)$ with respect to an external local perturbation $U(1)$, the BSE formalism considers a generalized 4-points susceptibility, or two-particle correlation function, that monitors the variation of the one-body Green's function $G(1,1')$ with respect to a non-local external perturbation $U(2,2')$:
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\begin{equation}
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\chi(1,2) \stackrel{\DFT}{=} \pdv{\rho(1)}{U(2)}
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\quad \rightarrow \quad
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L(12,34) \stackrel{\BSE}{=} -i \pdv{G(1,2)}{U(3,4)},
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L(1, 2;1',2' ) \stackrel{\BSE}{=} \pdv{G(1,1')}{U(2',2)},
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\end{equation}
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with the formal relations $\chi(1,2) = L(11,22)$ and $\rho(1) = -iG(1,1^{+})$ as a bridge between the TD-DFT and BSE worlds.
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The equation of motion for $G$ [see Eq.~\eqref{eq:Gmotion}] can be reformulated in the form of a Dyson equation
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where we follow the notations by Strinati.\cite{Strinati_1988} The formal relation $\chi(1,2) = -i L(1,2;1^+,2^+)$ with $\rho(1) = -iG(1,1^{+})$ offers a direct bridge between the TD-DFT and the BSE worlds.
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The equation of motion for $G$ [see Eq.~\eqref{eq:Gmotion}] can be reformulated in the form of a Dyson equation
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\begin{equation}
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G = G_0 + G_0 \Sigma G,
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G = G_0 + G_0 ( v_H + U + \Sigma ) G,
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\end{equation}
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that relates the full (interacting) Green's function, $G$, to its Hartree version, $G_0$, obtained by replacing the $\lbrace \varepsilon_p, f_p \rbrace$ by the Hartree eigenvalues and eigenfunctions.
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The derivative with respect to $U$ of the Dyson equation yields
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that relates the full (interacting) Green's function, $G$, to its non-interacting version, $G_0$, with $v_H$ and $U$ the Hartree and external potential, respectively, and $\Sigma$ the xc self-energy.
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The derivative with respect to $U$ of this Dyson equation yields
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\begin{multline}\label{eq:DysonL}
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L(12,34) = L_0(12,34)
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L(1,2;1',2') = L_0(1,2;1',2') +
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\\
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\int d5678 \, L_0(12,56) \Xi^{\BSE}(5,6,7,8) L(78,34),
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\int d3456 \, L_0(1,4;1',3) \Xi^{\BSE}(3,5;4,6) L(6,2;5,2'),
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\end{multline}
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where $L_0 = \partial G_0 / \partial U$ is the Hartree 4-point susceptibility and
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where $L_0(1,2;1',2') = G(1,2')G(2,1')$ is the non-interacting 4-point susceptibility and
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\begin{equation}
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\Xi^{\BSE}(5,6,7,8) = v(5,7) \delta(56) \delta(78) + \pdv{\Sigma(5,6)}{G(7,8)}
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i\Xi^{\BSE}(3,5;4,6) = v(3,6) \delta(34) \delta(56) + i \pdv{\Sigma(3,4)}{G(6,5)}
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\end{equation}
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is the so-called BSE kernel.
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This equation can be compared to its TD-DFT analog
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@ -397,7 +397,7 @@ where
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is the TD-DFT kernel.
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Plugging now the $GW$ self-energy [see Eq.~\eqref{eq:SigGW}], in a scheme that we label the BSE@$GW$ approach, leads to an approximation to the BSE kernel
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\begin{equation}\label{eq:BSEkernel}
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\Xi^{\BSE}(5,6,7,8) = v(5,7) \delta(56) \delta(78) -W(5,6) \delta(57) \delta(68 ),
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i \Xi^{\BSE}(3,5;4,6) = v(3,6) \delta(34) \delta(56) -W(3^+,4) \delta(36) \delta(45 ),
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\end{equation}
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where it is traditional to neglect the derivative $( \partial W / \partial G)$ that introduces again higher orders in $W$. \cite{Hanke_1980,Strinati_1982,Strinati_1984}
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Taking the static limit, \ie, $W(\omega=0)$, for the screened Coulomb potential, that replaces the static DFT xc kernel, and expressing Eq.~\eqref{eq:DysonL} in the standard product space $\lbrace \phi_i(\br) \phi_a(\br') \rbrace$ [where $(i,j)$ are occupied orbitals and $(a,b)$ are unoccupied orbitals), leads to an eigenvalue problem similar to the so-called Casida equations in TD-DFT:
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