Sharp bounds for decomposing graphs into edges and triangles

Abstract

For a real constant α, let π3α(G) be the minimum of twice the number of K2's plus α times the number of K3's over all edge decompositions of G into copies of K2 and K3, where Kr denotes the complete graph on r vertices. Let π3α(n) be the maximum of π3α(G) over all graphs G with n vertices. The extremal function π33(n) was first studied by Gyori and Tuza [Decompositions of graphs into complete subgraphs of given order, Studia Sci. Math. Hungar. 22 (1987), 315--320]. In a recent progress on this problem, Kr\'al', Lidick\'y, Martins and Pehova [Decomposing graphs into edges and triangles, Combin. Prob. Comput. 28 (2019) 465--472] proved via flag algebras that π33(n) (1/2+o(1))n2. We extend their result by determining the exact value of π3α(n) and the set of extremal graphs for all α and sufficiently large n. In particular, we show for α=3 that Kn and the complete bipartite graph K n/2, n/2 are the only possible extremal examples for large n.