English

Ramsey-type problems for tilings in dense graphs

Combinatorics 2025-08-18 v2

Abstract

Given a graph HH, the Ramsey number R(H)R(H) is the smallest positive integer nn such that every 22-edge-colouring of KnK_n yields a monochromatic copy of HH. We write mHmH to denote the union of mm vertex-disjoint copies of HH. The members of the family {mH:m1}\{mH:m\ge1\} are also known as HH-tilings. A well-known result of Burr, Erd\H{o}s and Spencer states that R(mK3)=5mR(mK_3)=5m for every m2m\ge2. On the other hand, Moon proved that every 22-edge-colouring of K3m+2K_{3m+2} yields a K3K_3-tiling consisting of mm monochromatic copies of K3K_3, for every m2m\ge2. Crucially, in Moon's result, distinct copies of K3K_3 might receive different colours. In this paper, we investigate the analogous questions where the complete host graph is replaced by a graph of large minimum degree. We determine the (asymptotic) minimum degree threshold for forcing a~K3K_3-tiling covering a prescribed proportion of the vertices in a 22-edge-coloured graph such that every copy of K3K_3 in the tiling is monochromatic. We also determine the largest size of a monochromatic K3K_3-tiling one can guarantee in any 22-edge-coloured graph of large minimum degree. These results therefore provide generalisations of the theorems of Moon and Burr-Erd\H{o}s-Spencer to the setting of dense graphs. It is also natural to consider generalisations of these problems to rr-edge-colourings (for r2r \geq 2) and for HH-tilings (for arbitrary graphs HH). We prove some results in this direction and propose several open questions.

Keywords

Cite

@article{arxiv.2502.13876,
  title  = {Ramsey-type problems for tilings in dense graphs},
  author = {József Balogh and Andrea Freschi and Andrew Treglown},
  journal= {arXiv preprint arXiv:2502.13876},
  year   = {2025}
}

Comments

21 pages, 5 figures. Author accepted manuscript, to appear in the European Journal of Combinatorics

R2 v1 2026-06-28T21:50:18.273Z