Classes of graphs embeddable in order-dependent surfaces

TL;DR

This paper estimates the size and growth rates of classes of graphs embeddable in surfaces with bounded Euler genus, revealing thresholds for their combinatorial complexity and generating function properties.

Contribution

It provides new asymptotic estimates for classes of graphs embeddable in surfaces of varying genus, including growth constants and conditions for generating function convergence.

Findings

For g(n)=o(n/log^3 n), the class has the planar graph growth constant.

When g(n)=O(n), estimates of the number of graphs are provided.

The generating functions have positive radius of convergence if and only if g(n)=O(n/log n).

Abstract

Given a function $g=g(n)$ we let ${\mathcal E}^g$ be the class of all graphs $G$ such that if $G$ has order $n$ (that is, has $n$ vertices) then it is embeddable in some surface of Euler genus at most $g(n)$, and let ${\widetilde{\mathcal E}}^g$ be the corresponding class of unlabelled graphs. We give estimates of the sizes of these classes. For example we show that if $g(n)=o(n/\log^3n)$ then the class ${\mathcal E}^{g}$ has growth constant $\gamma_{{\mathcal P}}$, the (labelled) planar graph growth constant; and when $g(n) = O(n)$ we estimate the number of n-vertex graphs in ${\mathcal E}^{g}$ and ${\widetilde{\mathcal E}}^g$ up to a factor exponential in $n$. From these estimates we see that, if ${\mathcal E}^g$ has growth constant $\gamma_{{\mathcal P}}$ then we must have $g(n)=o(n/\log n)$, and the generating functions for ${\mathcal E}^g$ and ${\widetilde{\mathcal E}}^g$ have strictly positive radius of convergence if and only if $g(n)=O(n/\log n)$. Such results also hold when we consider orientable and non-orientable surfaces separately. We also investigate related classes of graphs where we insist that, as well as the graph itself, each subgraph is appropriately embeddable (according to its number of vertices); and classes of graphs where we insist that each minor is appropriately embeddable. In a companion paper [43], these results are used to investigate random $n$-vertex graphs sampled uniformly from ${\mathcal E}^g$ or from similar classes.