6533b827fe1ef96bd1286551
RESEARCH PRODUCT
The strictly-correlated electron functional for spherically symmetric systems revisited
Michael SeidlSimone MarinoAugusto GerolinLuca NennaKlaas GiesbertzPaola Gori-giorgisubject
Chemical Physics (physics.chem-ph)[CHIM.THEO]Chemical Sciences/Theoretical and/or physical chemistryCondensed Matter - Strongly Correlated ElectronsStrongly Correlated Electrons (cond-mat.str-el)[MATH.MATH-MP]Mathematics [math]/Mathematical Physics [math-ph]Physics - Chemical PhysicsFOS: Physical sciencesMathematical Physics (math-ph)[MATH.MATH-OC]Mathematics [math]/Optimization and Control [math.OC]Mathematical Physics[MATH.MATH-NA]Mathematics [math]/Numerical Analysis [math.NA]description
The strong-interaction limit of the Hohenberg-Kohn functional defines a multimarginal optimal transport problem with Coulomb cost. From physical arguments, the solution of this limit is expected to yield strictly-correlated particle positions, related to each other by co-motion functions (or optimal maps), but the existence of such a deterministic solution in the general three-dimensional case is still an open question. A conjecture for the co-motion functions for radially symmetric densities was presented in Phys.~Rev.~A {\bf 75}, 042511 (2007), and later used to build approximate exchange-correlation functionals for electrons confined in low-density quantum dots. Colombo and Stra [Math.~Models Methods Appl.~Sci., {\bf 26} 1025 (2016)] have recently shown that these conjectured maps are not always optimal. Here we revisit the whole issue both from the formal and numerical point of view, finding that even if the conjectured maps are not always optimal, they still yield an interaction energy (cost) that is numerically very close to the true minimum. We also prove that the functional built from the conjectured maps has the expected functional derivative also when they are not optimal.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2017-02-16 |