Spectral lower bounds for the orthogonal and projective ranks of a graph

Abstract

The orthogonal rank of a graph G=(V,E) is the smallest dimension such that there exist non-zero column vectors xv∈C for v∈ V satisfying the orthogonality condition xv xw=0 for all vw∈ E. We prove that many spectral lower bounds for the chromatic number, , are also lower bounds for . This result complements a previous result by the authors, in which they showed that spectral lower bounds for are also lower bounds for the quantum chromatic number q. It is known that the quantum chromatic number and the orthogonal rank are incomparable. We conclude by proving an inertial lower bound for the projective rank f, and conjecture that a stronger inertial lower bound for is also a lower bound for f.