A Basic Structure for Grids in Surfaces

Abstract

A graph G embedded in a surface S is called an S-grid when every facial boundary walk has length four, that is, the topological dual graph of G in S is 4-regular. Aside from the case where S is the torus or Klein bottle, an S-grid must have vertices of degrees other than four. Let the sequence of degrees other than four in G be called the curvature sequence of G. We give a succinct characterization of S-grids with nonempty curvature sequence L in terms of graphs that have degree sequence L and are immersed in a certain way in S; furthermore, the immersion associated with the S-grid G is unique and so our characterization of S-grids also partitions the collection of all S-grids.