English

Upper bounds for the necklace folding problems

Combinatorics 2020-05-27 v1

Abstract

A necklace can be considered as a cyclic list of nn red and nn blue beads in an arbitrary order, and the goal is to fold it into two and find a large cross-free matching of pairs of beads of different colors. We give a counterexample for a conjecture about the necklace folding problem, also known as the separated matching problem. The conjecture (given independently by three sets of authors) states that μ=23\mu=\frac{2}{3}, where μ\mu is the ratio of the `covered' beads to the total number of beads. We refute this conjecture by giving a construction which proves that μ2\nolinebreak\nolinebreak2<0.5858\mu \le 2 \nolinebreak - \nolinebreak \sqrt 2 < 0.5858. Our construction also applies to the homogeneous model: when we are matching beads of the same color. Moreover, we also consider the problem where the two color classes not necessarily have the same size.

Keywords

Cite

@article{arxiv.2005.12603,
  title  = {Upper bounds for the necklace folding problems},
  author = {Endre Csóka and Zoltán L. Blázsik and Zoltán Király and Dániel Lenger},
  journal= {arXiv preprint arXiv:2005.12603},
  year   = {2020}
}
R2 v1 2026-06-23T15:48:54.599Z