English

Lorentz violating scalar Casimir effect for a $D$-dimensional sphere

High Energy Physics - Theory 2020-08-12 v2 High Energy Physics - Phenomenology

Abstract

We investigate the Casimir effect, due to the confinement of a scalar field in a DD-dimensional sphere, with Lorentz symmetry breaking. The Lorentz-violating part of the theory is described by the term λ(uϕ)2\lambda (u \cdot \partial \phi) ^{2}, where the parameter λ\lambda and the background vector uμu^{\mu} codify the breakdown of Lorentz symmetry. We compute, as a function of DD, the Casimir stress by using Green's function techniques for two specific choices of the vector uμu ^{\mu}. In the timelike case, uμ=(1,0,...,0)u ^{\mu} = (1,0,...,0), the Casimir stress can be factorized as the product of the Lorentz invariant result times the factor (1+λ)1/2(1 + \lambda) ^{-1/2}. For the radial spacelike case, uμ=(0,1,0,...,0)u ^{\mu} = (0,1,0,...,0), we obtain an analytical expression for the Casimir stress which nevertheless does not admit a factorization in terms of the Lorentz invariant result. For the radial spacelike case we find that there exists a critical value λc=λc(D)\lambda _{c} = \lambda _{c} (D) at which the Casimir stress transits from a repulsive behavior to an attractive one for any D>2D> 2. The physically relevant case D=3D = 3 is analyzed in detail where the critical value λcD=3=0.0025\lambda _{c}|_{\small D=3} = 0.0025 was found. As in the Lorentz symmetric case, the force maintains the divergent behavior at positive even integer values of DD.

Keywords

Cite

@article{arxiv.2006.00696,
  title  = {Lorentz violating scalar Casimir effect for a $D$-dimensional sphere},
  author = {A. Martín-Ruiz and C. A. Escobar and A. M. Escobar-Ruiz and O. J. Franca},
  journal= {arXiv preprint arXiv:2006.00696},
  year   = {2020}
}

Comments

V2: 14 pages, 5 figures; minor changes and clarifications. Accepted for publication in Physical Review D

R2 v1 2026-06-23T15:57:03.211Z