English

Explicit Baranyai Partitions for Quadruples, Part I: Quadrupling Constructions

Combinatorics 2020-07-24 v1

Abstract

It is well known that, whenever kk divides nn, the complete kk-uniform hypergraph on nn vertices can be partitioned into disjoint perfect matchings. Equivalently, the set of kk-subsets of an nn-set can be partitioned into parallel classes so that each parallel class is a partition of the nn-set. This result is known as Baranyai's theorem, which guarantees the existence of \emph{Baranyai partitions}. Unfortunately, the proof of Baranyai's theorem uses network flow arguments, making this result non-explicit. In particular, there is no known method to produce Baranyai partitions in time and space that scale linearly with the number of hyperedges in the hypergraph. It is desirable for certain applications to have an explicit construction that generates Baranyai partitions in linear time. Such an efficient construction is known for k=2k=2 and k=3k=3. In this paper, we present an explicit recursive quadrupling construction for k=4k=4 and n=4tn=4t, where t0,3,4,6,8,9 (mod 12)t \equiv 0,3,4,6,8,9 ~(\text{mod}~12). In a follow-up paper (Part II), the other values of~tt, namely t1,2,5,7,10,11 (mod 12)t \equiv 1,2,5,7,10,11 ~(\text{mod}~12), will be considered.

Keywords

Cite

@article{arxiv.2007.11626,
  title  = {Explicit Baranyai Partitions for Quadruples, Part I: Quadrupling Constructions},
  author = {Yeow Meng Chee and Tuvi Etzion and Han Mao Kiah and Alexander Vardy and Chengmin Wang},
  journal= {arXiv preprint arXiv:2007.11626},
  year   = {2020}
}
R2 v1 2026-06-23T17:19:37.157Z