Z-knotted and Z-homogeneous triangulations of surfaces

Abstract

A triangulation is called z-knotted if it has a single zigzag (up to reversing). A z-orientation on a triangulation is a minimal collection of zigzags which double covers the set of edges. An edge is of type I if zigzags from the z-orientation pass through it in different directions, otherwise this edge is of type II. If all zigzags from the z-orientation contain precisely two edges of type I after any edge of type II, then the z-oriented triangulation is said to be z-homogeneous. We describe an algorithm transferring each z-homogeneous trianguation to other z-homogeneous triangulation which is also z-knotted.