English

A universal formula for the field enhancement factor

Applied Physics 2018-05-24 v1 Mesoscale and Nanoscale Physics Plasma Physics

Abstract

The field enhancement factor (FEF) is an important quantity in field emission calculations since the tunneling electron current depends very sensitively on its magnitude. The exact dependence of FEF on the emitter height hh, the radius of curvature at the apex RaR_a, as well as the shape of the emitter base is still largely unknown. In this work, a universal formula for the field enhancement factor is derived. It depends on the ratio h/Rah/R_a and has the form γa=(2h/Ra)/[α1log(4h/Ra)α2]\gamma_a = (2h/R_a)/[\alpha_1 \log(4h/R_a) - \alpha_2 ] where α1\alpha_1, α2\alpha_2 depend on the charge distribution on the emitter. Numerical results show that a simpler form γa=(2h/Ra)/[log(4h/Ra)α]\gamma_a = (2h/R_a)/[\log(4h/R_a) - \alpha] is equally valid with α\alpha depending on the class of emitter and indicative of the shielding by the emitter-base. For the hyperboloid, conical and ellipsoid emitters, the value of α\alpha is 0,0.880, 0.88 and 22 while for the cylindrical base where shielding is minimum, α2.6\alpha \simeq 2.6.

Cite

@article{arxiv.1801.09990,
  title  = {A universal formula for the field enhancement factor},
  author = {Debabrata Biswas},
  journal= {arXiv preprint arXiv:1801.09990},
  year   = {2018}
}
R2 v1 2026-06-23T00:03:33.738Z