Monochromatic triangle-tilings in dense graphs without large independent sets

Abstract

Given two graphs H and G, an H-tiling is a family of vertex-disjoint copies of H in G. A perfect H-tiling covers all vertices of G. The Corradi-Hajnal theorem (1963) states that an n-vertex graph G with minimum degree δ(G) 2n/3 contains a perfect triangle-tiling. For an n-vertex graph G with independence number α(G)=o(n), Balogh, Molla and Sharifzadeh (Random Structures & Algorithms, 2016) showed that a minimum degree of (12+o(1))n forces a perfect triangle-tiling. In a 2-edge-colored graph, Balogh, Freschi, Treglown (European J. Combin. 2026) determined the (asymptotic) minimum degree threshold for forcing a strong or weak monochromatic triangle-tiling covering a prescribed proportion of the vertices: a strong tiling requires all triangles to be in the same color class, while a weak tiling only requires each triangle to be monochromatic. In this paper, we combine the conditions from these two lines of work and prove that every 2-edge-colored n-vertex graph G with α(G)=o(n) contains a weak monochromatic triangle-tiling of size \[ || cases 2δ(G)-n-o(n), & if 12 n δ(G) 35 n,\\[2mm] δ(G)/3-o(n), & if δ(G)>35 n. cases \] Both bounds are asymptotically optimal. We use the degree form regularity lemma in our proof.