English

Random necklaces require fewer cuts

Combinatorics 2021-12-30 v1 Probability

Abstract

It is known that any open necklace with beads of tt types in which the number of beads of each type is divisible by kk, can be partitioned by at most (k1)t(k-1)t cuts into intervals that can be distributed into kk collections, each containing the same number of beads of each type. This is tight for all values of kk and tt. Here, we consider the case of random necklaces, where the number of beads of each type is kmkm. Then the minimum number of cuts required for a ``fair'' partition with the above property is a random variable X(k,t,m)X(k,t,m). We prove that for fixed k,t,k,t, and large mm, this random variable is at least (k1)(t+1)/2(k-1)(t+1)/2 with high probability. For k=2k=2, fixed tt, and large mm, we determine the asymptotic behavior of the probability that X(2,t,m)=sX(2,t,m)=s for all values of sts\le t . We show that this probability is polynomially small when s<(t+1)/2s<(t+1)/2, it is bounded away from zero when s>(t+1)/2s>(t+1)/2, and decays like Θ(1/logm)\Theta ( 1/\log m) when s=(t+1)/2s=(t+1)/2. We also show that for large tt, X(2,t,1)X(2,t,1) is at most (0.4+o(1))t(0.4+o(1))t with high probability and that for large tt and large ratio k/logtk/\log t, X(k,t,1)X(k,t,1) is o(kt)o(kt) with high probability.

Keywords

Cite

@article{arxiv.2112.14488,
  title  = {Random necklaces require fewer cuts},
  author = {Noga Alon and Dor Elboim and János Pach and Gábor Tardos},
  journal= {arXiv preprint arXiv:2112.14488},
  year   = {2021}
}

Comments

34 pages

R2 v1 2026-06-24T08:34:31.917Z