English

Casimir force variability in one-dimensional QED systems

High Energy Physics - Theory 2019-06-19 v2 Mesoscale and Nanoscale Physics

Abstract

The Casimir force between two short-range charge sources, embedded in a background of one dimensional massive Dirac fermions, is explored by means of the original ln[Wronskian]\ln\text{[Wronskian]} contour integration techniques. For identical sources with the same (positive) charge, we find that in the non-perturbative region the Casimir interaction between them can reach sufficiently large negative values and simultaneously reveal the features of a long-range force in spite of nonzero fermion mass, that could significantly influence the properties of such quasi-one-dimensional QED systems. For large distances ss between sources we recover that their mutual interaction is governed first of all by the structure of the discrete spectrum of a single source, in dependence on which it can be tuned to give an attractive, a repulsive, or an (almost) compensated Casimir force with various rates of the exponential fall-down, quite different from the standard exp(2ms)\exp (-2 m s) law. By means of the same ln[Wronskian]\ln\text{[Wronskian]} techniques, the case of two δ\delta-sources is also considered in a self-consistent manner with similar results for the variability of the Casimir force. A quite different behavior of the Casimir force is found for the antisymmetric source-anti-source system. In particular, in this case, there is no possibility for a long-range interaction between sources. The asymptotics of the Casimir force follows the standard exp(2ms)\exp (-2 m s) law. Moreover, for small separations between sources, the Casimir force for symmetric and antisymmetric cases turns out to be of opposite sign.

Keywords

Cite

@article{arxiv.1812.03416,
  title  = {Casimir force variability in one-dimensional QED systems},
  author = {Yu. Voronina and I. Komissarov and K. Sveshnikov},
  journal= {arXiv preprint arXiv:1812.03416},
  year   = {2019}
}

Comments

22 pages, 33 figures

R2 v1 2026-06-23T06:36:27.498Z