English

Deranged matchings: proofs and conjectures

Combinatorics 2022-11-01 v2

Abstract

We introduce, and partially resolve, a conjecture that brings a three-centuries-old derangements phenomenon and its much younger two-decades-old analogue under the same umbrella. Through a graph-theoretic lens, a derangement is a perfect matching in the complete bipartite graph Kn,nK_{n,n} with a disjoint perfect matching MM removed. Likewise, a deranged matching is a perfect matching in the complete graph K2nK_{2n} minus a perfect matching MM'. With pm()\mathrm{pm}(\cdot) counting perfect matchings, the elder phenomenon takes the form pm(Kn,nM)/pm(Kn,n)1/e\mathrm{pm}(K_{n,n}-M)/\mathrm{pm}(K_{n,n})\to 1/e as nn\to\infty while its youthful analogue is pm(K2nM)/pm(K2n)1/e\mathrm{pm}(K_{2n}-M')/\mathrm{pm}(K_{2n})\to 1/\sqrt{e}. These starting graphs are both 2n2n-vertex `balanced complete rr-partite' graphs Kr×2n/rK_{r \times {2n}/{r}}, respectively with r=2r=2 and r=2nr=2n. We conjecture that pm(Kr×2n/rM)/pm(Kr×2n/r)er/(2r2)\mathrm{pm}(K_{r\times{2n}/r}-M)/\mathrm{pm}(K_{r\times{2n}/r})\sim e^{-r/(2r-2)} as nn\to\infty and establish several substantive special cases thereof. For just two examples, r=3r=3 yields the limit e3/4e^{-3/4} while r=nr=n results again in e1/2e^{-1/2}. Our tools blend combinatorics and analysis in a medley incorporating Inclusion-Exclusion and Tannery's Theorem.

Keywords

Cite

@article{arxiv.2209.11319,
  title  = {Deranged matchings: proofs and conjectures},
  author = {Daniel Johnston and P. Mark Kayll and Cory Palmer},
  journal= {arXiv preprint arXiv:2209.11319},
  year   = {2022}
}

Comments

19 pages, 3 figures

R2 v1 2026-06-28T01:56:05.997Z