Semiclassical theory for spatial density oscillations in fermionic systems
Abstract
We investigate the particle and kinetic-energy densities for a system of fermions bound in a local (mean-field) potential . We generalize a recently developed semiclassical theory [J. Roccia and M. Brack, Phys. Rev.\ Lett. {\bf 100}, 200408 (2008)], in which the densities are calculated in terms of the closed orbits of the corresponding classical system, to dimensions. We regularize the semiclassical results for the U(1) symmetry breaking occurring for spherical systems at and near the classical turning points where the Friedel oscillations are predominant and well reproduced by the shortest orbit going from to the closest turning point and back. For systems with spherical symmetry, we show that there exist two types of oscillations which can be attributed to radial and non-radial orbits, respectively. The semiclassical theory is tested against exact quantum-mechanical calculations for a variety of model potentials. We find a very good overall numerical agreement between semiclassical and exact numerical densities even for moderate particle numbers . Using a "local virial theorem", shown to be valid (except for a small region around the classical turning points) for arbitrary local potentials, we can prove that the Thomas-Fermi functional reproduces the oscillations in the quantum-mechanical densities to first order in the oscillating parts.
Cite
@article{arxiv.0912.4374,
title = {Semiclassical theory for spatial density oscillations in fermionic systems},
author = {J. Roccia and M. Brack and A. Koch},
journal= {arXiv preprint arXiv:0912.4374},
year = {2015}
}
Comments
LaTeX, 22pp, 15 figs, 1 table, to be published in Phys. Rev. E