Intersections of Cycling 2-factors

Abstract

Define an embedding of graph G=(V,E) with V a finite set of distinct points on the unit circle and E the set of line segments connecting the points. Let V1,…,Vk be a labeled partition of V into equal parts. A 2-factor is said to be cycling if for each u∈ V, u∈ Vi implies u is adjacent to a vertex in Vi+1\: (mod \: k) and a vertex in Vi-1\: (mod\: k). In this paper, we will present some new results about cycling 2-factors including a tight upper bound on the minimum number of intersections of a cycling 2-factor for k=3.