Ramsey-type problems for tilings in dense graphs
Abstract
Given a graph , the Ramsey number is the smallest positive integer such that every -edge-colouring of yields a monochromatic copy of . We write to denote the union of vertex-disjoint copies of . The members of the family are also known as -tilings. A well-known result of Burr, Erd\H{o}s and Spencer states that for every . On the other hand, Moon proved that every -edge-colouring of yields a -tiling consisting of monochromatic copies of , for every . Crucially, in Moon's result, distinct copies of 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~-tiling covering a prescribed proportion of the vertices in a -edge-coloured graph such that every copy of in the tiling is monochromatic. We also determine the largest size of a monochromatic -tiling one can guarantee in any -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 -edge-colourings (for ) and for -tilings (for arbitrary graphs ). 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