Multi-transversals for Triangles and the Tuza's Conjecture

TL;DR

This paper investigates a primal-dual relationship in triangle packings and coverings in graphs, providing a new bound related to Tuza's conjecture and introducing a local charging argument technique.

Contribution

It proves a non-trivial consequence of Tuza's conjecture, establishing bounds on edge sets intersecting triangles, and introduces a local charging method for primal-dual analysis.

Findings

Existence of a set F with |F| ≤ 2k ν(G) intersecting each triangle in at least k edges.

Strengthens Krivelevich's fractional version of Tuza's conjecture.

Introduces a local charging argument technique for primal-dual problems.

Abstract

In this paper, we study a primal and dual relationship about triangles: For any graph $G$, let $\nu(G)$ be the maximum number of edge-disjoint triangles in $G$, and $\tau(G)$ be the minimum subset $F$ of edges such that $G \setminus F$ is triangle-free. It is easy to see that $\nu(G) \leq \tau(G) \leq 3 \nu(G)$, and in fact, this rather obvious inequality holds for a much more general primal-dual relation between $k$-hyper matching and covering in hypergraphs. Tuza conjectured in $1981$ that $\tau(G) \leq 2 \nu(G)$, and this question has received attention from various groups of researchers in discrete mathematics, settling various special cases such as planar graphs and generalized to bounded maximum average degree graphs, some cases of minor-free graphs, and very dense graphs. Despite these efforts, the conjecture in general graphs has remained wide open for almost four decades. In this paper, we provide a proof of a non-trivial consequence of the conjecture; that is, for every $k \geq 2$, there exist a (multi)-set $F \subseteq E(G): |F| \leq 2k \nu(G)$ such that each triangle in $G$ overlaps at least $k$ elements in $F$. Our result can be seen as a strengthened statement of Krivelevich's result on the fractional version of Tuza's conjecture (and we give some examples illustrating this.) The main technical ingredient of our result is a charging argument, that locally identifies edges in $F$ based on a local view of the packing solution. This idea might be useful in further studying the primal-dual relations in general and the Tuza's conjecture in particular.