On the inversion number of oriented graphs
Abstract
Let be an oriented graph. The inversion of a set of vertices in consists in reversing the direction of all arcs with both ends in . The inversion number of , denoted by , is the minimum number of inversions needed to make acyclic. Denoting by , , and the cycle transversal number, the cycle arc-transversal number and the cycle packing number of respectively, one shows that , and there exists a function such that . We conjecture that for any two oriented graphs and , where is the dijoin of and . This would imply that the first two inequalities are tight. We prove this conjecture when and and when and and are strongly connected. We also show that the function of the third inequality satisfies . We then consider the complexity of deciding whether for a given oriented graph . We show that it is NP-complete for , which together with the above conjecture would imply that it is NP-complete for every . This contrasts with a result of Belkhechine et al. which states that deciding whether for a given tournament is polynomial-time solvable.
Keywords
Cite
@article{arxiv.2105.04137,
title = {On the inversion number of oriented graphs},
author = {Jørgen Bang-Jensen and Jonas Costa Ferreira da Silva and Frédéric Havet},
journal= {arXiv preprint arXiv:2105.04137},
year = {2024}
}