English

Rainbow Arborescence Conjecture

Combinatorics 2025-12-10 v2 Discrete Mathematics Data Structures and Algorithms

Abstract

The famous Ryser--Brualdi--Stein conjecture asserts that every k×kk \times k Latin square contains a partial transversal of size k1k-1. Since its appearance, the conjecture has attracted significant interest, leading to several proposed generalizations. One of the most notable of these, by Aharoni, Kotlar, and Ziv, conjectures that kk disjoint common bases of two matroids of rank kk have a common independent partial transversal of size k1k-1. Although simple counterexamples show that the size k1k-1 above cannot be improved to kk (i.e., a transversal instead of a partial transversal), it is remarkable that no such counterexample is known for the special case of spanning arborescences. This motivated the formulation of the Rainbow Arborescence Conjecture: any graph on nn vertices formed by the union of n1n-1 spanning arborescences contains an arborescence using exactly one arc from each. We prove several partial results on this conjecture. We show that the computational problem of testing the existence of such an arborescence with a fixed root is NP-complete, verify the conjecture in several special cases, and study relaxations of the problem. In particular, we establish the validity of the conjecture when the underlying undirected graph is a cycle; this also yields a new result on systems of distinct representatives for intervals on a cycle.

Keywords

Cite

@article{arxiv.2412.15457,
  title  = {Rainbow Arborescence Conjecture},
  author = {Kristóf Bérczi and Tamás Király and Yutaro Yamaguchi and Yu Yokoi},
  journal= {arXiv preprint arXiv:2412.15457},
  year   = {2025}
}

Comments

27 pages, 31 figures; integrating arXiv:2511.04953

R2 v1 2026-06-28T20:43:11.533Z