Even maps, the Colin de~Verdi\`ere number and representations of graphs

Abstract

Van der Holst and Pendavingh introduced a graph parameter σ, which coincides with the more famous Colin de Verdi\`ere graph parameter μ for small values. However, the definition of σ is much more geometric/topological directly reflecting embeddability properties of the graph. They proved μ(G) ≤ σ(G) + 2 and conjectured μ(G) ≤ σ(G) for any graph G. We confirm this conjecture. As far as we know, this is the first topological upper bound on μ(G) which is, in general, tight. Equality between μ and σ does not hold in general as van der Holst and Pendavingh showed that there is a graph G with μ(G) ≤ 18 and σ(G)≥ 20. We show that the gap appears on much smaller values, namely, we exhibit a graph H for which μ(H)≤ 7 and σ(H)≥ 8. We also prove that, in general, the gap can be large: The incidence graphs Hq of finite projective planes of order q satisfy μ(Hq) ∈ O(q3/2) and σ(Hq) ≥ q2.