Irreducible Quadrangulations of the Torus

## Abstract In this article, we shall prove that every bipartite quadrangulation __G__ on the torus admits a simple closed curve visiting each face and each vertex of __G__ exactly once but crossing no edge. As an application, we conclude that the radial graph of any bipartite quadrangulation on th

In this paper we investigate the irreducibility of certain modules for the Lie-algebra of diffeomorphisms of torus T d . The Lie-algebra of diffeomorw " 1 " 1 x Ž phisms can be described as the derivations of A s C t , . . . t see 1 d w x. w x RSS . We denote this Lie-algebra by Der A. Larsson L1 co

The diameter of a directed graph is the maximum of the lengths of the shortest paths between all pairs of vertices. A directed graph is said to be tightly oriented if it has the same diameter as its undirected image graph. Our main result is tight orientations for all sufficiently large toroids, exc

We determine the complete list of the irreducible triangulations of the Klein bottle, up to equivalence, analyzing their structures. 1997 Academic Press ## 1. Introduction A triangulation of a closed surface is a simple graph embedded on the surface so that each face is triangular and that any tw

That is, for a cocommuta-Ž . Ž . Ž . tive irreducible coalgebra C, the homomorphism y \*: Br C ª Br C\* is injective. The proof uses Morita᎐Takeuchi theory and the linear topology of all closed Ž . cofinite left ideals in C\*. As an inmediate consequence, Br C is a torsion group. Ž . Some cases wher