1995
DOI: 10.1103/physreva.51.2040
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Exact exchange-correlation potential and approximate exchange potential in terms of density matrices

Abstract: An exact expression in terms of density matrices (DMs) is derived for hF [n]/hn(r), the functional derivative of the Hohenberg-Kohn functional. The derivation starts from the differential form of the virial theorem, obtained here for an electron system with arbitrary interactions, and leads to an expression taking the form of an integral over a path that can be chosen arbitrarily. After applying this approach to the equivalent system of noninteracting electrons (Slater-Kohu-Sham scheme) and combining the corre… Show more

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Cited by 177 publications
(138 citation statements)
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“…Thus, the bosonized potential argument strongly suggests, if not definitively proving, that HF equality (34) proposed by Alonso and March, [19] remains valid in the presence of electron correlation. But now both l and I are themselves changed by the electron-electron interaction "correction".…”
Section: Correlation Aspects As Consequences Of the Pauli Potentialmentioning
confidence: 99%
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“…Thus, the bosonized potential argument strongly suggests, if not definitively proving, that HF equality (34) proposed by Alonso and March, [19] remains valid in the presence of electron correlation. But now both l and I are themselves changed by the electron-electron interaction "correction".…”
Section: Correlation Aspects As Consequences Of the Pauli Potentialmentioning
confidence: 99%
“…(38) is the single-particle (s) limit of the many-electron vector field zðrÞ defined by Holas and March [34] from the kinetic energy density tensor t ab r ð Þ. In turn, this latter quantity is expressible in terms of first-order (many-electron) density matrix c r 1 ; r 2 ð Þ by…”
Section: Differential Virial Theorem In Terms Of Pauli Potential For mentioning
confidence: 99%
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“…We adopt here the approach via the differential virial theorem (DVT), going back to March and Young [4] for arbitrary level filling in one dimension and generalized first to spherically symmetric systems by Nagy and March [6] then to three dimensions by Holas and March [5]. Their result for the magnitude of ∂V /∂r of the force associated with the one-body potential V (r) of DFT [3] reads, in spherical symmetry…”
mentioning
confidence: 99%