On Minrank and the Lov\'asz Theta Function

Abstract

Two classical upper bounds on the Shannon capacity of graphs are the -function due to Lov\'asz and the minrank parameter due to Haemers. We provide several explicit constructions of n-vertex graphs with a constant -function and minrank at least nδ for a constant δ>0 (over various prime order fields). This implies a limitation on the -function-based algorithmic approach to approximating the minrank parameter of graphs. The proofs involve linear spaces of multivariate polynomials and the method of higher incidence matrices.