Monotone Measures for Non-Local Correlations

TL;DR

This paper introduces a systematic method to identify closed sets of non-local correlations using a generalized measure called maximal correlation, demonstrating its monotonicity under wirings and establishing the existence of multiple such sets.

Contribution

It proposes the first general approach to construct closed sets of non-local correlations by leveraging maximal correlation and related mathematical tools.

Findings

Maximal correlation decreases under wirings.

Existence of a continuum of closed non-local sets.

Introduction of maximal correlation ribbon and its properties.

Abstract

Non-locality is the phenomenon of observing strong correlations among the outcomes of local measurements of a multipartite physical system. No-signaling boxes are the abstract objects for studying non-locality, and wirings are local operations on the space of no-signaling boxes. This means that, no matter how non-local the nature is, the set of physical non-local correlations must be closed under wirings. Then, one approach to identify the non-locality of nature is to characterize closed sets of non-local correlations. Although non-trivial examples of wirings of no-signaling boxes are known, there is no systematic way to study wirings. In particular, given a set of no-signaling boxes, we do not know a general method to prove that it is closed under wirings. In this paper, we propose the first general method to construct such closed sets of non-local correlations. We show that a well-known measure of correlation, called maximal correlation, when appropriately defined for non-local correlations, is monotonically decreasing under wirings. This establishes a conjecture about the impossibility of simulating isotropic boxes from each other, implying the existence of a continuum of closed sets of non-local boxes under wirings. To prove our main result, we introduce some mathematical tools that may be of independent interest: we define a notion of maximal correlation ribbon as a generalization of maximal correlation, and provide a connection between it and a known object called hypercontractivity ribbon; we show that these two ribbons are monotone under wirings too.