Codegree conditions for tilling balanced complete 3-partite 3-graphs and generalized 4-cycles

Abstract

Given two k-graphs F and H, a perfect F-tiling (also called an F-factor) in H is a set of vertex disjoint copies of F that together cover the vertex set of H. Let tk-1(n, F) be the smallest integer t such that every k-graph H on n vertices with minimum codegree at least t contains a perfect F-tiling. Mycroft (JCTA, 2016) determined the asymptotic values of tk-1(n, F) for k-partite k-graphs F. Mycroft also conjectured that the error terms o(n) in tk-1(n, F) can be replaced by a constant that depends only on F. In this paper, we improve the error term of Mycroft's result to a sub-linear term when F=K3(m), the complete 3-partite 3-graph with each part of size m. We also show that the sub-linear term is tight for K3(2), the result also provides another family of counterexamples of Mycroft's conjecture (Gao, Han, Zhao (arXiv, 2016) gave a family of counterexamples when H is a k-partite k-graph with some restrictions.) Finally, we show that Mycroft's conjecture holds for generalized 4-cycle C43 (the 3-graph on six vertices and four distinct edges A, B, C, D with A B= C D and A B=C D=), i.e. we determine the exact value of t2(n, C43).