English

A note on counting flows in signed graphs

Combinatorics 2017-01-26 v1

Abstract

Tutte initiated the study of nowhere-zero flows and proved the following fundamental theorem: For every graph GG there is a polynomial ff so that for every abelian group Γ\Gamma of order nn, the number of nowhere-zero Γ\Gamma-flows in GG is f(n)f(n). For signed graphs (which have bidirected orientations), the situation is more subtle. For a finite group Γ\Gamma, let ϵ2(Γ)\epsilon_2(\Gamma) be the largest integer dd so that Γ\Gamma has a subgroup isomorphic to Z2d\mathbb{Z}_2^d. We prove that for every signed graph GG and d0d \ge 0 there is a polynomial fdf_d so that fd(n)f_d(n) is the number of nowhere-zero Γ\Gamma-flows in GG for every abelian group Γ\Gamma with ϵ2(Γ)=d\epsilon_2(\Gamma) = d and Γ=2dn|\Gamma| = 2^d n. Beck and Zaslavsky had previously established the special case of this result when d=0d=0 (i.e., when Γ\Gamma has odd order).

Keywords

Cite

@article{arxiv.1701.07369,
  title  = {A note on counting flows in signed graphs},
  author = {Matt DeVos and Edita Rollová and Robert Šámal},
  journal= {arXiv preprint arXiv:1701.07369},
  year   = {2017}
}

Comments

7 pages

R2 v1 2026-06-22T18:00:07.846Z