We give asymptotically converging semidefinite programming hierarchies of outer bounds on bilinear programs of the form $\mathrm{Tr}\big[M(X\otimes Y)\big]$, maximized with respect to semidefinite constraints on $X$ and $Y$. 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 co...
We give a converging semidefinite programming hierarchy of outer approximations for the set of quant...
We show that the problem of designing a quantum information error correcting procedure can be cast a...
This paper studies a fundamental problem in convex optimization, which is to solve semidefinite prog...
We give asymptotically converging semidefinite programming hierarchies of outer bounds on bilinear p...
We derive converging hierarchies of efficiently computable semidefinite programming outer bounds on ...
We study optimization programs given by a bilinear form over noncommutative variables subject to lin...
We study optimization programs given by a bilinear form over noncommutative variables subject to lin...
We study and extend the semidefinite programming (SDP) hierarchies introduced in Navascués and Vérte...
University of Technology Sydney. Faculty of Engineering and Information Technology.This thesis aims ...
© 2016 IEEE. Recently the power of positive partial transpose preserving (PPTp) and no-signalling (N...
We describe a simple method to derive high performance semidefinite programing relaxations for optim...
We show that the maximum fidelity obtained by a positive partial transpose (p.p.t.) distillation pro...
© 2017 IEEE. We study the classical communication over quantum channels when assisted by no-signalli...
In this paper, we consider a simplified error-correcting problem: for a fixed encoding process, to f...
In this paper we study optimization problems related to bipartite quantum correlations using techniq...
We give a converging semidefinite programming hierarchy of outer approximations for the set of quant...
We show that the problem of designing a quantum information error correcting procedure can be cast a...
This paper studies a fundamental problem in convex optimization, which is to solve semidefinite prog...
We give asymptotically converging semidefinite programming hierarchies of outer bounds on bilinear p...
We derive converging hierarchies of efficiently computable semidefinite programming outer bounds on ...
We study optimization programs given by a bilinear form over noncommutative variables subject to lin...
We study optimization programs given by a bilinear form over noncommutative variables subject to lin...
We study and extend the semidefinite programming (SDP) hierarchies introduced in Navascués and Vérte...
University of Technology Sydney. Faculty of Engineering and Information Technology.This thesis aims ...
© 2016 IEEE. Recently the power of positive partial transpose preserving (PPTp) and no-signalling (N...
We describe a simple method to derive high performance semidefinite programing relaxations for optim...
We show that the maximum fidelity obtained by a positive partial transpose (p.p.t.) distillation pro...
© 2017 IEEE. We study the classical communication over quantum channels when assisted by no-signalli...
In this paper, we consider a simplified error-correcting problem: for a fixed encoding process, to f...
In this paper we study optimization problems related to bipartite quantum correlations using techniq...
We give a converging semidefinite programming hierarchy of outer approximations for the set of quant...
We show that the problem of designing a quantum information error correcting procedure can be cast a...
This paper studies a fundamental problem in convex optimization, which is to solve semidefinite prog...