On digraphs without onion star immersions
Abstract
The -onion star is the digraph obtained from a star with leaves by replacing every edge by a triple of arcs, where in triples we orient two arcs away from the center, and in the remaining triples we orient two arcs towards the center. Note that the -onion star contains, as an immersion, every digraph on vertices where each vertex has outdegree at most and indegree at most , or vice versa. We investigate the structure in digraphs that exclude a fixed onion star as an immersion. The main discovery is that in such digraphs, for some duality statements true in the undirected setting we can prove their directed analogues. More specifically, we show the next two statements. There is a function satisfying the following: If a digraph contains a set of vertices such that for any there are arc-disjoint paths from to , then contains the -onion star as an immersion. There is a function satisfying the following: If and is a pair of vertices in a digraph such that there are at least arc-disjoint paths from to and there are at least arc-disjoint paths from to , then either contains the -onion star as an immersion, or there is a family of pairwise arc-disjoint paths with paths from to and paths from to .
Keywords
Cite
@article{arxiv.2211.15477,
title = {On digraphs without onion star immersions},
author = {Łukasz Bożyk and Oscar Defrain and Karolina Okrasa and Michał Pilipczuk},
journal= {arXiv preprint arXiv:2211.15477},
year = {2023}
}
Comments
14 pages, 5 figures