Separators in region intersection graphs

Abstract

For undirected graphs G=(V,E) and G0=(V0,E0), say that G is a region intersection graph over G0 if there is a family of connected subsets \ Ru ⊂eq V0 : u ∈ V \ of G0 such that \u,v\ ∈ E Ru Rv ≠ . We show if G0 excludes the complete graph Kh as a minor for some h ≥ 1, then every region intersection graph G over G0 with m edges has a balanced separator with at most ch m nodes, where ch is a constant depending only on h. If G additionally has uniformly bounded vertex degrees, then such a separator is found by spectral partitioning. A string graph is the intersection graph of continuous arcs in the plane. The preceding result implies that every string graph with m edges has a balanced separator of size O(m). This bound is optimal, as it generalizes the planar separator theorem. It confirms a conjecture of Fox and Pach (2010), and improves over the O(m m) bound of Matousek (2013).