Even Embeddings of the Complete Graphs and Their Cycle Parities

Abstract: The complete graph Kn on n vertices can be quadrangularly embedded on an orientable (resp. nonorientable) closed surface F2 with Euler characteristic εfalse(F2false)=nfalse(5−nfalse)/4 if and only if n≡0,5(mod8) (resp. n≡0,1(mod4) and n≠5). In this article, we shall show that if Kn quadrangulates a closed surface F2, then Kn has a quadrangular embedding on F2 so that the length of each closed walk in the embedding has the parity specified by any given homomorphism ρ:π1false(F2false)→double-struckZ2, called the… Show more

“…A quadrangulation of Σ is a special case of an evenly embedded graph, that is, one such that each face is bounded by a closed walk of even length. The graph is also called even embedding, for example, [6,18]. Since bipartite graphs have no cycles of odd length, any bipartite graph should be evenly embedded on any surface.…”

Spanning bipartite quadrangulations of triangulations of the projective plane

“…A quadrangulation of Σ is a special case of an evenly embedded graph, that is, one such that each face is bounded by a closed walk of even length. The graph is also called even embedding, for example, [6,18]. Since bipartite graphs have no cycles of odd length, any bipartite graph should be evenly embedded on any surface.…”

Spanning bipartite quadrangulations of triangulations of the projective plane

Odd complete minors in even embeddings on surfaces

Spanning Bipartite Quadrangulations of Triangulations of the Projective Plane