One-and-a-half quantum de Finetti theorems
摘要
We prove a new kind of quantum de Finetti theorem for representations of the unitary group U(d). Consider a pure state that lies in the irreducible representation U_{mu+nu} for Young diagrams mu and nu. U_{mu+nu} is contained in the tensor product of U_mu and U_nu; let xi be the state obtained by tracing out U_nu. We show that xi is close to a convex combination of states Uv, where U is in U(d) and v is the highest weight vector in U_mu. When U_{mu+nu} is the symmetric representation, this yields the conventional quantum de Finetti theorem for symmetric states, and our method of proof gives near-optimal bounds for the approximation of xi by a convex combination of product states. For the class of symmetric Werner states, we give a second de Finetti-style theorem (our 'half' theorem); the de Finetti-approximation in this case takes a particularly simple form, involving only product states with a fixed spectrum. Our proof uses purely group theoretic methods, and makes a link with the shifted Schur functions. It also provides some useful examples, and gives some insight into the structure of the set of convex combinations of product states.
引用
@article{arxiv.quant-ph/0602130,
title = {One-and-a-half quantum de Finetti theorems},
author = {Matthias Christandl and Robert Koenig and Graeme Mitchison and Renato Renner},
journal= {arXiv preprint arXiv:quant-ph/0602130},
year = {2009}
}
备注
14 pages, 3 figures, v4: minor additions (including figures), published version