Densities of minor-closed graph classes are rational

Abstract

For a graph class F, let exF(n) denote the maximum number of edges in a graph in F on n vertices. We show that for every proper minor-closed graph class F the function exF(n) - n is eventually periodic, where = n ∞ exF(n)/n is the limiting density of F. This confirms a special case of a conjecture by Geelen, Gerards and Whittle. In particular, the limiting density of every proper minor-closed graph class is rational, which answers a question of Eppstein. As a major step in the proof we show that every proper minor-closed graph class contains a subclass of bounded pathwidth with the same limiting density, confirming a conjecture of the second author. Finally, we investigate the set of limiting densities of classes of graphs closed under taking topological minors.