Boxicity and topological invariants

TL;DR

This paper establishes tight bounds on the boxicity of graphs based on their edges, Colin de Verdi e' invariants, and surface embeddings, revealing deep connections between geometric and topological graph properties.

Contribution

It proves asymptotically optimal bounds on boxicity related to edges and surface genus, and explores its relationship with the Colin de Verdi e' invariant.

Findings

Graphs with m edges have boxicity O(√(m log m))

Graphs on surfaces of genus g have boxicity O(√g log g)

Bounds on boxicity relate to the Colin de Verdi e' invariant

Abstract

The boxicity of a graph $G=(V,E)$ is the smallest integer $k$ for which there exist $k$ interval graphs $G_i=(V,E_i)$, $1 \le i \le k$, such that $E=E_1 \cap \cdots \cap E_k$. In the first part of this note, we prove that every graph on $m$ edges has boxicity $O(\sqrt{m \log m})$, which is asymptotically best possible. We use this result to study the connection between the boxicity of graphs and their Colin de Verdi\`ere invariant, which share many similarities. Known results concerning the two parameters suggest that for any graph $G$, the boxicity of $G$ is at most the Colin de Verdi\`ere invariant of $G$, denoted by $\mu(G)$. We observe that every graph $G$ has boxicity $O(\mu(G)^4(\log \mu(G))^2)$, while there are graphs $G$ with boxicity $\Omega(\mu(G)\sqrt{\log \mu(G)})$. In the second part of this note, we focus on graphs embeddable on a surface of Euler genus $g$. We prove that these graphs have boxicity $O(\sqrt{g}\log g)$, while some of these graphs have boxicity $\Omega(\sqrt{g \log g})$. This improves the previously best known upper and lower bounds. These results directly imply a nearly optimal bound on the dimension of the adjacency poset of graphs on surfaces.