DocumentCode
3512429
Title
Zero-error communication via quantum channels and a quantum Lovász θ-function
Author
Duan, Runyao ; Severini, Simone ; Winter, Andreas
Author_Institution
QCIS Centre, Univ. of Technol., Sydney, NSW, Australia
fYear
2011
fDate
July 31 2011-Aug. 5 2011
Firstpage
64
Lastpage
68
Abstract
We study the quantum channel version of Shannon´s zero-error capacity problem. Motivated by recent progress on this question, we propose to consider a certain linear space operators as the quantum generalisation of the adjacency matrix, in terms of which the plain, quantum and entanglement-assisted capacity can be formulated, and for which we show some new basic properties. Most importantly, we define a quantum version of Lovász´ famous υ function, as the norm-completion (or stabilisation) of a “naive” generalisation of υ. We go on to show that this function upper bounds the number of entanglement-assisted zero-error messages, that it is given by a semidefinite programme, whose dual we write down explicitly, and that it is multiplicative with respect to the natural (strong) graph product. We explore various other properties of the new quantity, which reduces to Lovász´ original υ in the classical case, give several applications, and propose to study the linear spaces of operators associated to channels as “non-commutative graphs”, using the language of operator systems and Hilbert modules.
Keywords
channel capacity; graph theory; mathematical programming; matrix algebra; quantum communication; Hilbert modules; Shannon zero-error capacity problem; adjacency matrix; entanglement-assisted capacity; entanglement-assisted zero-error messages; linear space operators; natural graph product; noncommutative graphs; operator systems; quantum Lovász υ-function; quantum capacity; quantum channel version; quantum generalisation; semidefinite programme; zero-error communication;
fLanguage
English
Publisher
ieee
Conference_Titel
Information Theory Proceedings (ISIT), 2011 IEEE International Symposium on
Conference_Location
St. Petersburg
ISSN
2157-8095
Print_ISBN
978-1-4577-0596-0
Electronic_ISBN
2157-8095
Type
conf
DOI
10.1109/ISIT.2011.6034211
Filename
6034211
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