Self-testing of exact entanglement embezzlement

Abstract

We consider bipartite exact entanglement embezzlement with a catalyst state vector ψ in a Hilbert space H using unitaries (or more generally, contractions). If M ⊂eq B(H) is a von Neumann algebra and U ∈ Md M and V ∈ M' Md are unitaries (or more generally contractions), then such a protocol is of the form (U Id)(Id V)(e0 ψ e0)=Σi=0d-1 αi ei ψ ei, where each αi>0 and Σi=0d-1 αi2=1. We show that any such protocol must arise from a unique state on the tensor product Od Od of the Cuntz algebra with itself. As a result, we prove that exact entanglement embezzlement is a self-test for a collection of d Cuntz isometries for each party and a unique quasi-free state on the Cuntz algebra Od in the sense of Iz93. Moreover, we use modular theory to show that the von Neumann algebra generated by the copy of Od is the unique separable approximately finite-dimensional Type IIIλ factor for some 0<λ≤ 1, where λ can be determined by an algebraic condition on the Schmidt coefficients of the state φ=Σi=0d-1 αi ei ei.