Spectral lower bounds for the quantum chromatic number of a graph

Abstract

The quantum chromatic number, q(G), of a graph G was originally defined as the minimal number of colors necessary in a quantum protocol in which two provers that cannot communicate with each other but share an entangled state can convince an interrogator with certainty that they have a coloring of the graph. We use an equivalent purely combinatorial definition of q(G) to prove that many spectral lower bounds for the chromatic number, (G), are also lower bounds for q(G). This is achieved using techniques from linear algebra called pinching and twirling. We illustrate our results with some examples.