Taking one charge off a two-dimensional Wigner crystal
Abstract
A planar array of identical charges at vanishing temperature forms a Wigner crystal with hexagonal symmetry. We take off one (reference) charge in a perpendicular direction, hold it fixed, and search for the ground state of the whole system. The planar projection of the reference charge should then evolve from a six-fold coordination (center of a hexagon) for small distances to a three-fold arrangement (center of a triangle), at large distances from the plane. The aim of this paper is to describe the corresponding non-trivial lattice transformation. For that purpose, two numerical methods (direct energy minimization and Monte Carlo simulations), together with an analytical treatment, are presented. Our results indicate that the and limiting cases extend for finite values of from the respective starting points into two sequences of stable states, with intersecting energies at some value ; beyond this value the branches continue as metastable states.
Keywords
Cite
@article{arxiv.1401.8167,
title = {Taking one charge off a two-dimensional Wigner crystal},
author = {Moritz Antlanger and Martial Mazars and Ladislav Šamaj and Gerhard Kahl and Emmanuel Trizac},
journal= {arXiv preprint arXiv:1401.8167},
year = {2015}
}
Comments
17 pages, 11 figures