Bipartite matrix-valued tensor product correlations that are not finitely representable

Abstract

We consider the matrix-valued generalizations of bipartite tensor product quantum correlations and bipartite infinite-dimensional tensor product quantum correlations, respectively. These sets are denoted by Cq(n)(m,k) and Cqs(n)(m,k), respectively, where m is the number of inputs, k is the number of outputs, and n is the matrix size. We show that, for any m,k ≥ 2 with (m,k) ≠ (2,2), there is an n ≤ 4 for which we have the separation Cq(n)(m,k) ≠ Cqs(n)(m,k).