Packing and covering a given directed graph in a directed graph
Abstract
For every fixed , it is proved that if an -vertex directed graph has at most pairwise arc-disjoint directed -cycles, then there exists a set of at most arcs that meets all directed -cycles and that the set of -cycles admits a fractional cover of value at most . It is also proved that the ratio cannot be improved to a constant smaller than . For the constant is improved to and for it was recently shown by Cooper et al. that the constant can be taken to be . The result implies a deterministic polynomial time -approximation algorithm for the directed -cycle cover problem, improving upon a previous -approximation algorithm of Kortsarz et al. More generally, for every directed graph we introduce a graph parameter for which it is proved that if an -vertex directed graph has at most pairwise arc-disjoint -copies, then there exists a set of at most arcs that meets all -copies and that the set of -copies admits a fractional cover of value at most . It is shown that for almost all it holds that and that for every -vertex tournament it holds that .
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