English

On Regular Set Systems Containing Regular Subsystems

Combinatorics 2020-09-23 v1 Discrete Mathematics

Abstract

Let X,YX,Y be finite sets, r,s,h,λNr,s,h, \lambda \in \mathbb{N} with sr,XYs\geq r, X\subsetneq Y. By λ(Xh)\lambda \binom{X}{h} we mean the collection of all hh-subsets of XX where each subset occurs λ\lambda times. A coloring of λ(Xh)\lambda\binom{X}{h} is {\it rr-regular} if in every color class each element of XX occurs rr times. A one-regular color class is a {\it perfect matching}. We are interested in the necessary and sufficient conditions under which an rr-regular coloring of λ(Xh)\lambda \binom{X}{h} can be embedded into an ss-regular coloring of λ(Yh)\lambda \binom{Y}{h}. Using algebraic techniques involving glueing together orbits of a suitably chosen cyclic group, the first author and Newman (Combinatorica 38 (2018), no. 6, 1309--1335) solved the case when λ=1,r=s,gcd(X,Y,h)=gcd(Y,h)\lambda=1,r=s, \gcd (|X|,|Y|,h)=\gcd(|Y|,h). Using purely combinatorial techniques, we nearly settle the case h=4h=4. Two major challenges include finding all the necessary conditions, and obtaining the exact bound for Y|Y|. It is worth noting that completing partial symmetric latin squares is closely related to the case λ=r=s=1,h=2\lambda =r=s=1, h=2 which was solved by Cruse (J. Comb. Theory Ser. A 16 (1974), 18--22).

Keywords

Cite

@article{arxiv.2009.10597,
  title  = {On Regular Set Systems Containing Regular Subsystems},
  author = {Amin Bahmanian and Sadegheh Haghshenas},
  journal= {arXiv preprint arXiv:2009.10597},
  year   = {2020}
}

Comments

26 pages, 1 figure

R2 v1 2026-06-23T18:43:18.637Z