A Generalization of Quantum Stein's Lemma

TL;DR

This paper generalizes quantum Stein's Lemma to families of non-i.i.d. states, providing an operational interpretation of entanglement measures and establishing their faithfulness in multipartite systems.

Contribution

It extends quantum Stein's Lemma to non-i.i.d. state families, linking quantum relative entropy to error rates and entanglement measures.

Findings

Error rate function characterized by quantum relative entropy

Regularized relative entropy of entanglement is faithful

Operational and mathematical definitions of multipartite entanglement are equivalent

Abstract

We present a generalization of quantum Stein's Lemma to the situation in which the alternative hypothesis is formed by a family of states, which can moreover be non-i.i.d.. We consider sets of states which satisfy a few natural properties, the most important being the closedness under permutations of the copies. We then determine the error rate function in a very similar fashion to quantum Stein's Lemma, in terms of the quantum relative entropy. Our result has two applications to entanglement theory. First it gives an operational meaning to an entanglement measure known as regularized relative entropy of entanglement. Second, it shows that this measure is faithful, being strictly positive on every entangled state. This implies, in particular, that whenever a multipartite state can be asymptotically converted into another entangled state by local operations and classical communication, the rate of conversion must be non-zero. Therefore, the operational definition of multipartite entanglement is equivalent to its mathematical definition.