A Theory for Coloring Walks in a Digraph
Abstract
Consider edge colorings of digraphs where edges v1 v2 and v2 v3 have different colors. This coloring induces a vertex coloring by sets of edge colors, in which edge v1 v2 in the graph implies that the set color of v1 contains an element not in the set color of v2, and conversely. We generalize to colorings of k(vertex)-walks, defined so two walks have different colors if one is the prefix c1 and the other is the suffix c2 of a common (k+1)-walk. Further, the colors can belong to a poset P where c1, c2 must satisfy c1 ≤ c2. This set construction generalizes the lower order ideal in P from a set of k-walk colors; these order ideals are partially ordered by containment. We conclude that a P coloring of k-walks exists iff there is a vertex coloring by A iterated k-1 times on P, where Birkhoff's A maps a poset to its poset of lower order ideals. Thus the directed chromatic index problem is generalized and reduced to poset coloring of vertices. This work uses ideas, results and motivations due to Cole and Vishkin on deterministic coin tossing and Becker and Simon on vertex covers for subsets of (n-2)-cubes.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.