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Line 21: The exchange-energy density of a HEG is known analytically. The LDA for exchange employs this expression under the approximation that the exchange-energy in a system where the density in not homogeneous, is obtained by applying the HEG results pointwise, yielding the expression<ref name="parryang">{{cite book\|last=Parr\|first=Robert G\|coauthors=Yang, Weitao\|title=Density-Functional Theory of Atoms and Molecules\|publisher=Oxford University Press\|___location=Oxford \|date=1994\|isbn=978-0-19-509276-9}}</ref><ref>{{cite journal\|last=Dirac\|first=P. A. M.\|date=1930\|title=Note on exchange phenomena in the Thomas-Fermi atom\|journal=Proc. Cambridge Phil. Roy. Soc.\|volume=26\|pages=376–385}}</ref> :<math>E_x = - \frac{3}{4}\left( \frac{3}{\pi} \right)^{1/3}\int\~~mathrm{d}~~rho(\mathbf{r}~~\ \rho~~)^{4/3}(\ \mathrm{d}\mathbf{r}).</math> == Correlation functional ==

Local-density approximation: Difference between revisions