On Tuza's conjecture for triangulations and graphs with small treewidth

Abstract

Tuza (1981) conjectured that the size τ(G) of a minimum set of edges that intersects every triangle of a graph G is at most twice the size (G) of a maximum set of edge-disjoint triangles of G. In this paper we present three results regarding Tuza's Conjecture. We verify it for graphs with treewidth at most 6; we show that τ(G)≤ 32\,(G) for every planar triangulation G different from K4; and that τ(G)≤95\,(G) + 15 if G is a maximal graph with treewidth 3. Our first result strengthens a result of Tuza, implying that τ(G) ≤ 2\,(G) for every K8-free chordal graph G.