A note on extremal intersecting linear Ryser systems
Abstract
A famous conjecture of Ryser states that any -partite set system has transversal number at most times their matching number. This conjecture is only known to be true for in general, for if the set system is intersecting, and for if the intersecting set system is linear. In this note, we deal with Ryser's Conjecture for intersecting -partite linear systems; that is, if is the transversal number for an intersecting -partite linear system, then Ryser's Conjecture states that . If this conjecture is true, this is known to be sharp for for which there exists a projective plane of order . There has also been considerable effort to find intersecting -partite set systems whose transversal number is . In this note, the following is proved: if is an even integer, then , where is the minimum number of lines of an intersecting -partite linear system whose transversal number is . This lower bound gives an exact value for , for some small values of . Also, we prove that any -partite linear system satisfies if for all odd integer and for all even integer, where is the maximum cardinality of a subset of lines such that every triplet of different elements of does not have a common point.
Cite
@article{arxiv.2108.01108,
title = {A note on extremal intersecting linear Ryser systems},
author = {Adrián Vázquez Ávila},
journal= {arXiv preprint arXiv:2108.01108},
year = {2021}
}