Sampling quantum nonlocal correlations with high probability

Abstract

It is well known that quantum correlations for bipartite dichotomic measurements are those of the form γ=( ui,vj)i,j=1n, where the vectors ui and vj are in the unit ball of a real Hilbert space. In this work we study the probability of the nonlocal nature of these correlations as a function of α=mn, where the previous vectors are sampled according to the Haar measure in the unit sphere of Rm. In particular, we prove the existence of an α0>0 such that if α≤ α0, γ is nonlocal with probability tending to 1 as n→ ∞, while for α> 2, γ is local with probability tending to 1 as n→ ∞.