New Separations in Zero-Error Channel Capacity Through Projective Kochen–Specker Sets and Quantum Coloring

Author

Mancinska, Laura ; Scarpa, Giuseppe ; Severini, Simone

Author_Institution

Inst. for Quantum Comput., Univ. of Waterloo, Waterloo, ON, Canada

Volume

59

Issue

6

fYear

2013

fDate

Jun-13

Firstpage

4025

Lastpage

4032

Abstract

We introduce two generalizations of Kochen-Specker (KS) sets: projective KS sets and generalized KS sets. We then use projective KS sets to characterize all graphs for which the chromatic number is strictly larger than the quantum chromatic number. Here, the quantum chromatic number is defined via a nonlocal game based on graph coloring. We further show that from any graph with separation between these two quantities, one can construct a classical channel for which entanglement assistance increases the one-shot zero-error capacity. As an example, we exhibit a new family of classical channels with an exponential increase.

Keywords

channel capacity; graph colouring; quantum entanglement; generalized KS sets; graph coloring; nonlocal game; one-shot zero-error capacity; projective Kochen-Specker sets; quantum chromatic number; quantum coloring; zero-error channel capacity; Channel capacity; Color; Games; Protocols; Quantum entanglement; Vectors; Channel capacity; graph theory; quantum entanglement; quantum mechanics;

fLanguage

English

Journal_Title

Information Theory, IEEE Transactions on

Publisher

ieee

ISSN

0018-9448

Type

jour

DOI

10.1109/TIT.2013.2248031

Filename

6466384