Abstract
We study zero-error entanglement-assisted source-channel coding (communication in the presence of side information). Adapting a technique of Beigi, we show that such coding requires existence of a set of vectors satisfying orthogonality conditions related to suitably defined graphs G and H. Such vectors exist if and only if{G}}) ≤\H , where represents the Lovász number. We also obtain similar inequalities for the related Schrijver {- and Szegedy (+ numbers. These inequalities reproduce several known bounds and also lead to new results. We provide a lower bound on the entanglement-assisted cost rate. We show that the entanglement-assisted independence number is bounded by the Schrijver number: α(G) \le {- (G)). Therefore, we are able to disprove the conjecture that the one-shot entanglement-assisted zero-error capacity is equal to the integer part of the Lovász number. Beigi introduced a quantity \(\beta \) as an upper bound on α) and posed the question of whether β (G) = \lfloor (G) \rfloor \). We answer this in the affirmative and show that a related quantity is equal to \(\lceil (G) \rceil \). We show that a quantity χ G)recently introduced in the context of Tsirelson's problem is equal to \(lceil +} {G}}) \rceil \). In an appendix, we investigate multiplicativity properties of Schrijver's and Szegedy's numbers, as well as projective rank.
Original language | English |
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Article number | 6880319 |
Pages (from-to) | 7330-7344 |
Number of pages | 15 |
Journal | IEEE Transactions on Information Theory |
Volume | 60 |
Issue number | 11 |
DOIs | |
State | Published - Nov 2014 |
Externally published | Yes |