Geometric chained inequalities for higher-dimensional systems
Quantum Physics
2014-07-15 v2
Abstract
For systems of an arbitrary dimension, a theory of geometric chained Bell inequalities is presented. The approach is based on chained inequalities derived by Pykacz and Santos. For maximally entangled states the inequalities lead to a complete contradiction with quantum predictions. Local realism suggests that the probability for the two observes to have identical results is (that is a perfect correlation is predicted), whereas quantum formalism gives an opposite prediction: the local results always differ. This is so for any dimension. We also show that with the inequalities, one can have a version of Bell's theorem which involves only correlations arbitrarily close to perfect ones.
Cite
@article{arxiv.1404.6888,
title = {Geometric chained inequalities for higher-dimensional systems},
author = {Marek Żukowski and Arijit Dutta},
journal= {arXiv preprint arXiv:1404.6888},
year = {2014}
}
Comments
7 pages, Almost identical with the published version