English

Many-box locality

Quantum Physics 2017-11-28 v2

Abstract

There is an ongoing search for a physical or operational definition for quantum mechanics. Several informational principles have been proposed which are satisfied by a theory less restrictive than quantum mechanics. Here, we introduce the principle of "many-box locality", which is a refined version of the previously proposed "macroscopic locality". These principles are based on coarse-graining the statistics of several copies of a given box. The set of behaviors satisfying many-box locality for NN boxes is denoted MBLNMBL_N. We study these sets in the bipartite scenario with two binary measurements, in relation with the sets Q\mathcal{Q} and Q1+AB\mathcal{Q}_{1+AB} of quantum and "almost quantum" correlations. We find that the MBLNMBL_N sets are in general not convex. For unbiased marginals, by working in the Fourier space we can prove analytically that MBLNQMBL_{N}\subsetneq\mathcal{Q} for any finite NN, while MBL=QMBL_{\infty}=\mathcal{Q}. Then, with suitably developed numerical tools, we find an example of a point that belongs to MBL16MBL_{16} but not to Q1+AB\mathcal{Q}_{1+AB}. Among the problems that remain open, is whether QMBL\mathcal{Q}\subset MBL_{\infty}.

Keywords

Cite

@article{arxiv.1708.03067,
  title  = {Many-box locality},
  author = {Yuqian Zhou and Yu Cai and Jean-Daniel Bancal and Fei Gao and Valerio Scarani},
  journal= {arXiv preprint arXiv:1708.03067},
  year   = {2017}
}

Comments

10 pages, 4 figures, 2 ancillary files; v2: similar to published version

R2 v1 2026-06-22T21:11:06.134Z