Symmetric vs. bosonic extension for bipartite states

Abstract

A bipartite state AB has a k-symmetric extension if there exists a k+1-partite state AB1B2… Bk with marginals ABi=AB, ∀ i. The k-symmetric extension is called bosonic if AB1B2… Bk is supported on the symmetric subspace of B1B2… Bk. Understanding the structure of symmetric/bosonic extension has various applications in the theory of quantum entanglement, quantum key distribution and the quantum marginal problem. In particular, bosonic extension gives a tighter bound for the quantum marginal problem based on seperability. In general, it is known that a AB admitting symmetric extension may not have bosonic extension. In this work, we show that when the dimension of the subsystem B is 2 (i.e. a qubit), AB admits a k-symmetric extension if and only if it has a k-bosonic extension. Our result has an immediate application to the quantum marginal problem and indicates a special structure for qubit systems based on group representation theory.