Phase transitions in graphs on orientable surfaces

Abstract

Let Sg be the orientable surface of genus g. We prove that the component structure of a graph chosen uniformly at random from the class Sg(n,m) of all graphs on vertex set [n]=\1,…c,n\ with m edges embeddable on Sg features two phase transitions. The first phase transition mirrors the classical phase transition in the Erdos--R\'enyi random graph G(n,m) chosen uniformly at random from all graphs with vertex set [n] and m edges. It takes place at m=n2+O(n2/3), when a unique largest component, the so-called giant component, emerges. The second phase transition occurs at m = n+O(n3/5), when the giant component covers almost all vertices of the graph. This kind of phenomenon is strikingly different from G(n,m) and has only been observed for graphs on surfaces. Moreover, we derive an asymptotic estimation of the number of graphs in Sg(n,m) throughout the regimes of these two phase transitions.