English

Semidefinite programming hierarchies for constrained bilinear optimization

Quantum Physics 2021-07-13 v3

Abstract

We give asymptotically converging semidefinite programming hierarchies of outer bounds on bilinear programs of the form Tr[M(XY)]\mathrm{Tr}\big[M(X\otimes Y)\big], maximized with respect to semidefinite constraints on XX and YY. Applied to the problem of quantum error correction this gives hierarchies of efficiently computable outer bounds on the optimal fidelity for any message dimension and error model. The first level of our hierarchies corresponds to the non-signalling assisted fidelity previously studied by [Leung & Matthews, IEEE Trans.~Inf.~Theory 2015], and positive partial transpose constraints can be added and used to give a sufficient criterion for the exact convergence at a given level of the hierarchy. To quantify the worst case convergence speed of our hierarchies, we derive novel quantum de Finetti theorems that allow imposing linear constraints on the approximating state. In particular, we give finite de Finetti theorems for quantum channels, quantifying closeness to the convex hull of product channels as well as closeness to local operations and classical forward communication assisted channels. As a special case this constitutes a finite version of Fuchs-Schack-Scudo's asymptotic de Finetti theorem for quantum channels. Finally, our proof methods also allow us to answer an open question from [Brand\~ao & Harrow, STOC 2013] by improving the approximation factor of de Finetti theorems with no symmetry from O(dk/2)O(d^{k/2}) to poly(d,k)\mathrm{poly}(d,k), where dd denotes local dimension and kk the number of copies.

Keywords

Cite

@article{arxiv.1810.12197,
  title  = {Semidefinite programming hierarchies for constrained bilinear optimization},
  author = {Mario Berta and Francesco Borderi and Omar Fawzi and Volkher Scholz},
  journal= {arXiv preprint arXiv:1810.12197},
  year   = {2021}
}

Comments

33 pages, New Title, v3

R2 v1 2026-06-23T04:56:03.087Z