2013
DOI: 10.1021/ct400247p
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Orbital Entanglement in Bond-Formation Processes

Abstract: The accurate calculation of the (differential) correlation energy is central to the quantum chemical description of bond-formation and bond-dissociation processes. In order to estimate the quality of single- and multireference approaches for this purpose, various diagnostic tools have been developed. In this work, we elaborate on our previous observation [J. Phys. Chem. Lett.2012, 3, 3129] that one- and two-orbital-based entanglement measures provide quantitative means for the assessment and classification of … Show more

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Cited by 128 publications
(237 citation statements)
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“…Their electronic structures have been extensively discussed in the literature and we refer the interested reader to, for instances, refs. [73][74][75][76][77] for more details. Table II summarizes the spectroscopic constants for the C 2 , N 2 , and BN molecules.…”
Section: A Molecular Systems Dominated By Static/nondynamic Correlationmentioning
confidence: 99%
“…Their electronic structures have been extensively discussed in the literature and we refer the interested reader to, for instances, refs. [73][74][75][76][77] for more details. Table II summarizes the spectroscopic constants for the C 2 , N 2 , and BN molecules.…”
Section: A Molecular Systems Dominated By Static/nondynamic Correlationmentioning
confidence: 99%
“…Let us clarify the relation between the introduced definition of the mode-reduced states and the orbital reduced density matrices used in quantum chemistry [61,62]. In quantum chemistry, the mode is a composite of the space orbital state and the electron spin projection (| ↑ or | ↓ ), and the whole system state vector is written in the form |Ψ = n1,...,nL ψ n1,...,nL |n 1 ⊗ .…”
Section: Spectra Of Mode-reduced Statesmentioning
confidence: 99%
“…The reduced 2-mode state reads Tr e1,e2,e3 |Ψ Ψ| as each vector |e 1 ⊗ |n i ⊗ |e 2 ⊗ |n j ⊗ |e 3 does have a tensor product structure. Using the orbit basis |n i = {|0 , | ↑ , | ↓ , | ↑↓ }, one gets the 2-orbital reduced density operator [61]. In our approach, the global basis states |j 1 .…”
Section: Spectra Of Mode-reduced Statesmentioning
confidence: 99%
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“…Furthermore, when combined with concepts of quantum information theory, DMRG allows us to quantify orbital entanglement [32] and orbital-pair correlations [30,[33][34][35][36][37][38][39] that enable us to gain a better understanding of electron correlation effects, [36,40,41] elucidate chemical bonding in molecules, [37,[42][43][44][45][46][47] and detect changes in the electronic wave function. [48][49][50] The suitability of DMRG for helping to understand the electronic structure of actinides can be seen in a recent study of the changes in the ground-state for the CUO molecule when diluted in different noble gas matrices.…”
Section: Introductionmentioning
confidence: 99%