Toward a density Corr\'adi--Hajnal theorem for degenerate hypergraphs
Abstract
Given an r-graph F with r 2, let ex(n, (t+1) F) denote the maximum number of edges in an n-vertex r-graph with at most t pairwise vertex-disjoint copies of F. Extending several old results and complementing prior work [J. Hou, H. Li, X. Liu, L.-T. Yuan, and Y. Zhang. A step towards a general density Corr\'adi--Hajnal theorem. arXiv:2302.09849, 2023.] on nondegenerate hypergraphs, we initiate a systematic study on ex(n, (t+1) F) for degenerate hypergraphs F. For a broad class of degenerate hypergraphs F, we present near-optimal upper bounds for ex(n, (t+1) F) when n is sufficiently large and t lies in intervals [0, · ex(n,F)nr-1], [ex(n,F) nr-1, n ], and [ (1-)nv(F), nv(F) ], where > 0 is a constant depending only on F. Our results reveal very different structures for extremal constructions across the three intervals, and we provide characterizations of extremal constructions within the first interval. Additionally, for graphs, we offer a characterization of extremal constructions within the second interval. Our proof for the first interval also applies to a special class of nondegenerate hypergraphs, including those with undetermined Tur\'an densities, partially improving a result in [J. Hou, H. Li, X. Liu, L.-T. Yuan, and Y. Zhang. A step towards a general density Corr\'adi--Hajnal theorem. arXiv:2302.09849, 2023.]
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.