English

Bell's Inequalities for Continuous-Variable Systems in Generic Squeezed States

Quantum Physics 2016-08-24 v2 Cosmology and Nongalactic Astrophysics High Energy Physics - Theory

Abstract

Bell's inequality for continuous-variable bipartite systems is studied. The inequality is expressed in terms of pseudo-spin operators and quantum expectation values are calculated for generic two-mode squeezed states characterized by a squeezing parameter rr and a squeezing angle φ\varphi. Allowing for generic values of the squeezing angle is especially relevant when φ\varphi is not under experimental control, such as in cosmic inflation, where small quantum fluctuations in the early Universe are responsible for structures formation. Compared to previous studies restricted to φ=0\varphi=0 and to a fixed orientation of the pseudo-spin operators, allowing for φ0\varphi\neq 0 and optimizing the angular configuration leads to a completely new and rich phenomenology. Two dual schemes of approximation are designed that allow for comprehensive exploration of the squeezing parameters space. In particular, it is found that Bell's inequality can be violated when the squeezing parameter rr is large enough, r1.12r\gtrsim 1.12, and the squeezing angle φ\varphi is small enough, φ0.34er\varphi\lesssim 0.34\,e^{-r}.

Keywords

Cite

@article{arxiv.1605.02944,
  title  = {Bell's Inequalities for Continuous-Variable Systems in Generic Squeezed States},
  author = {Jerome Martin and Vincent Vennin},
  journal= {arXiv preprint arXiv:1605.02944},
  year   = {2016}
}

Comments

9 pages without appendices (38 pages total), 16 figures, matches published version in Physical Review A

R2 v1 2026-06-22T13:57:20.155Z