Tur\'an-type and tiling problems in oriented graphs
Abstract
Given , let be the tournament on vertices obtained by replacing the vertices of the directed triangle with transitive tournaments , , and , respectively. Keevash and Sudakov (2009) showed that every sufficiently large oriented graph on vertices with contains a -tiling, equivalently a -tiling, covering all but at most three vertices. We generalize this result to arbitrary blow-ups . Specifically, for any fixed , every sufficiently large oriented graph on vertices with contains a -tiling covering all but at most vertices. Moreover, this bound is essentially sharp. We also establish a stronger stability result: if , then either contains a -factor, or is close to an extremal graph. Our interest in is also motivated by oriented Tur\'an theory: a seminal theorem of Bollob\'as and H\"aggkvist (1990) shows that a tournament is Tur\'anable (i.e., contained in every sufficiently large regular tournament) if and only if for some . Complementing our tiling results, we also investigate related semi-degree thresholds for powers of directed cycles and paths. In particular, we present two -vertex constructions that give lower bounds, showing that the minimum semi-degree thresholds for with and for with are at least and , respectively.
Keywords
Cite
@article{arxiv.2603.21971,
title = {Tur\'an-type and tiling problems in oriented graphs},
author = {Ming Chen and Wenxu Lu and Yun Wang and Zhiwei Zhang},
journal= {arXiv preprint arXiv:2603.21971},
year = {2026}
}
Comments
26 pages + 6 pages appendix,3 figures