Combinatorics of Even-Valent Graphs on Riemann Surfaces

Abstract

In this paper, we derive explicit formulae for the number of regular even-valent graphs, with fixed minimal embedding genus, in which both the valence parameter and the number of vertices are allowed to vary. Our results extend the explicit formulae of Ercolani--McLaughlin--Pierce (2008) for genus 0 and of Ercolani--Lega--Tippings (2023) for genus 1. More precisely, we obtain explicit counts Ng(2ν,j) -- with ν and j as variables -- of graphs with j vertices of uniform valence 2ν and minimal embedding genus g, for 2≤ g≤ 4. We also obtain the corresponding formulae for the two-legged counts Ng(2ν,j). The method applies to g≥ 5, with increasing computational effort as g increases. Finally, we derive leading-order large-valence asymptotics for these counts when g≤ 4, and formulate a structural conjecture for higher genus.