On the degree sequences of dual graphs on surfaces

Abstract

Given two graphs G and G* with a one-to-one correspondence between their edges, when do G and G* form a pair of dual graphs realizing the vertices and countries of a map embedded in a surface? A criterion was obtained by Jack Edmonds in 1965. Furthermore, let d=(d1,…,dn) and t=(t1,…,tm) be their degree sequences. Then, clearly, Σi=1n di = Σj=1m tj = 2, where is the number of edges in each of the two graphs, and = n - + m is the Euler characteristic of the surface. Which sequences d and t satisfying these conditions still cannot be realized as the degree sequences? We make use of Edmonds' criterion to obtain several infinite series of exceptions for the sphere, = 2, and projective plane, = 1. We conjecture that there exist no exceptions for ≤ 0.