English

On the inversion number of oriented graphs

Combinatorics 2024-02-14 v5 Discrete Mathematics

Abstract

Let DD be an oriented graph. The inversion of a set XX of vertices in DD consists in reversing the direction of all arcs with both ends in XX. The inversion number of DD, denoted by inv(D){\rm inv}(D), is the minimum number of inversions needed to make DD acyclic. Denoting by τ(D)\tau(D), τ(D)\tau' (D), and ν(D)\nu(D) the cycle transversal number, the cycle arc-transversal number and the cycle packing number of DD respectively, one shows that inv(D)τ(D){\rm inv}(D) \leq \tau' (D), inv(D)2τ(D){\rm inv}(D) \leq 2\tau(D) and there exists a function gg such that inv(D)g(ν(D)){\rm inv}(D)\leq g(\nu(D)). We conjecture that for any two oriented graphs LL and RR, inv(LR)=inv(L)+inv(R){\rm inv}(L\rightarrow R) ={\rm inv}(L) +{\rm inv}(R) where LRL\rightarrow R is the dijoin of LL and RR. This would imply that the first two inequalities are tight. We prove this conjecture when inv(L)1{\rm inv}(L)\leq 1 and inv(R)2{\rm inv}(R)\leq 2 and when inv(L)=inv(R)=2{\rm inv}(L) ={\rm inv}(R)=2 and LL and RR are strongly connected. We also show that the function gg of the third inequality satisfies g(1)4g(1)\leq 4. We then consider the complexity of deciding whether inv(D)k{\rm inv}(D)\leq k for a given oriented graph DD. We show that it is NP-complete for k=1k=1, which together with the above conjecture would imply that it is NP-complete for every kk. This contrasts with a result of Belkhechine et al. which states that deciding whether inv(T)k{\rm inv}(T)\leq k for a given tournament TT 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}
}
R2 v1 2026-06-24T01:55:53.285Z