On Minrank and Forbidden Subgraphs

Abstract

The minrank over a field F of a graph G on the vertex set \1,2,…,n\ is the minimum possible rank of a matrix M ∈ Fn × n such that Mi,i ≠ 0 for every i, and Mi,j=0 for every distinct non-adjacent vertices i and j in G. For an integer n, a graph H, and a field F, let g(n,H,F) denote the maximum possible minrank over F of an n-vertex graph whose complement contains no copy of H. In this paper we study this quantity for various graphs H and fields F. For finite fields, we prove by a probabilistic argument a general lower bound on g(n,H,F), which yields a nearly tight bound of (n/ n) for the triangle H=K3. For the real field, we prove by an explicit construction that for every non-bipartite graph H, g(n,H,R) ≥ nδ for some δ = δ(H)>0. As a by-product of this construction, we disprove a conjecture of Codenotti, Pudl\'ak, and Resta. The results are motivated by questions in information theory, circuit complexity, and geometry.