# On transversal and 2-packing numbers in uniform linear systems

**Authors:** Carlos A. Alfaro, G. Araujo-Pardo, C. Rubio-Montiel, Adri\'an, V\'azquez-\'Avila

arXiv: 1903.08984 · 2019-03-29

## TL;DR

This paper investigates the relationship between transversal and 2-packing numbers in uniform linear systems, providing new constructions, properties, and characterizations, especially for intersecting systems where these parameters are equal.

## Contribution

It introduces an infinite family of linear systems with equal transversal and 2-packing numbers, and characterizes 4-uniform intersecting systems with this property.

## Key findings

- Constructed an infinite family with $	au=
u_2$ and minimal size
- Analyzed properties of $r$-uniform intersecting systems with $	au=
u_2=r$
- Characterized 4-uniform intersecting systems with $	au=
u_2=4$

## Abstract

A linear system is a pair $(P,\mathcal{L})$ where $\mathcal{L}$ is a family of subsets on a ground finite set $P$, such that $|l\cap l^\prime|\leq 1$, for every $l,l^\prime \in \mathcal{L}$. The elements of $P$ and $\mathcal{L}$ are called points and lines, respectively, and the linear system is called intersecting if any pair of lines intersect in exactly one point. A subset $T$ of points of $P$ is a transversal of $(P,\mathcal{L})$ if $T$ intersects any line, and the transversal number, $\tau(P,\mathcal{L})$, is the minimum order of a transversal. On the other hand, a 2-packing set of a linear system $(P,\mathcal{L})$ is a set $R$ of lines, such that any three of them have a common point, then the 2-packing number of $(P,\mathcal{L})$, $\nu_2(P,\mathcal{L})$, is the size of a maximum 2-packing set. It is known that the transversal number $\tau(P,\mathcal{L})$ is bounded above by a quadratic function of $\nu_2(P,\mathcal{L})$. An open problem is to haracterize the families of linear systems which satisfies $\tau(P,\mathcal{L})\leq \lambda\nu_2(P,\mathcal{L})$, for some $\lambda\geq1$. In this paper, we give an infinite family of linear systems $(P,\mathcal{L})$ which satisfies $\tau(P,\mathcal{L})=\nu_2(P,\mathcal{L})$ with smallest possible cardinality of $\mathcal{L}$, as well as some properties of $r$-uniform intersecting linear systems $(P,\mathcal{L})$, such that $\tau(P,\mathcal{L})=\nu_2(P,\mathcal{L})=r$. Moreover, we state a characterization of $4$-uniform intersecting linear systems $(P,\mathcal{L})$ with $\tau(P,\mathcal{L})=\nu_2(P,\mathcal{L})=4$.

## Full text

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## Figures

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## References

23 references — full list in the complete paper: https://tomesphere.com/paper/1903.08984/full.md

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Source: https://tomesphere.com/paper/1903.08984