English

Packing and covering a given directed graph in a directed graph

Combinatorics 2023-12-05 v1

Abstract

For every fixed k4k \ge 4, it is proved that if an nn-vertex directed graph has at most tt pairwise arc-disjoint directed kk-cycles, then there exists a set of at most 23kt+o(n2)\frac{2}{3}kt+ o(n^2) arcs that meets all directed kk-cycles and that the set of kk-cycles admits a fractional cover of value at most 23kt\frac{2}{3}kt. It is also proved that the ratio 23k\frac{2}{3}k cannot be improved to a constant smaller than k2\frac{k}{2}. For k=5k=5 the constant 2k/32k/3 is improved to 25/825/8 and for k=3k=3 it was recently shown by Cooper et al. that the constant can be taken to be 9/59/5. The result implies a deterministic polynomial time 23k\frac{2}{3}k-approximation algorithm for the directed kk-cycle cover problem, improving upon a previous (k1)(k{-}1)-approximation algorithm of Kortsarz et al. More generally, for every directed graph HH we introduce a graph parameter f(H)f(H) for which it is proved that if an nn-vertex directed graph has at most tt pairwise arc-disjoint HH-copies, then there exists a set of at most f(H)t+o(n2)f(H)t+ o(n^2) arcs that meets all HH-copies and that the set of HH-copies admits a fractional cover of value at most f(H)tf(H)t. It is shown that for almost all HH it holds that f(H)E(H)/2f(H) \approx |E(H)|/2 and that for every kk-vertex tournament HH it holds that f(H)k2/4f(H) \le \lfloor k^2/4 \rfloor.

Keywords

Cite

@article{arxiv.2312.01901,
  title  = {Packing and covering a given directed graph in a directed graph},
  author = {Raphael Yuster},
  journal= {arXiv preprint arXiv:2312.01901},
  year   = {2023}
}

Comments

to appear in SIAM Journal on Discrete Mathematics

R2 v1 2026-06-28T13:40:21.908Z