Two conjectures on vertex-disjoint rainbow triangles

Abstract

In 1963, Dirac proved that every n-vertex graph has k vertex-disjoint triangles if n≥ 3k and minimum degree δ(G)≥ n+k2. The base case n=3k can be reduced to the Corr\'adi-Hajn\'al Theorem. Towards a rainbow version of Dirac's Theorem, Hu, Li, and Yang conjectured that for all positive integers n and k with n≥ 3k, every edge-colored graph G of order n with δc(G)≥ n+k2 contains k vertex-disjoint rainbow triangles. In another direction, Wu et al. conjectured an exact formula for anti-Ramsey number ar(n,kC3), generalizing the earlier work of Erdos, S\'os and Simonovits. The conjecture of Hu, Li, and Yang was confirmed for the cases k=1 and k=2. However, Lo and Williams disproved the conjecture when n≤ 17k5. It is therefore natural to ask whether the conjecture holds for n=(k). In this paper, we confirm this by showing that the Hu-Li-Yang conjecture holds when n 42.5k+48. We disprove the conjecture of Wu et al. and propose a modified conjecture. This conjecture is motivated by previous works due to Allen, B\"ottcher, Hladk\'y, and Piguet on Tur\'an number of vertex-disjoint triangles.

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