Packing subgraphs in regular graphs
Abstract
An \emph{-packing} in a graph is a collection of pairwise vertex-disjoint copies of in . We prove that for every and every bipartite graph , any -regular graph admits an -packing that covers all but a constant number of vertices. This resolves a problem posed by K\"uhn and Osthus in 2005. Moreover, our result is essentially tight: the conclusion fails if is not both regular and sufficiently dense, it is in general not possible to guarantee covering all vertices of by an -packing, and if is non-bipartite then need not contain any copies of . We also prove that for all , integers , and sufficiently large , all the vertices of every -regular graph can be covered by vertex-disjoint subdivisions of . This resolves another problem of K\"uhn and Osthus from 2005, which goes back to a conjecture of Verstra\"ete from 2002. Our proofs combine novel methods for balancing expanders and super-regular subgraphs with a number of powerful techniques including properties of robust expanders, regularity lemma, and blow-up lemma.
Cite
@article{arxiv.2509.26180,
title = {Packing subgraphs in regular graphs},
author = {Shoham Letzter and Abhishek Methuku and Benny Sudakov},
journal= {arXiv preprint arXiv:2509.26180},
year = {2026}
}
Comments
37 pages