English

Nowhere-zero 9-flows in 3-edge-connected signed graphs

Combinatorics 2016-04-13 v3

Abstract

A signed graph is a graph with a positive or negative sign on each edge. Regarding each edge as two half edges, an orientation of a signed graph is an assignment of a direction to each of its half edges such that the two half edges of a positive edge receive the same direction and that of a negative edge receive opposite directions. A signed graph with such an orientation is called a bidirected graph. A nowhere-zero kk-flow of a bidirected graph is an assignment of an integer from {(k1),,1,1,,(k1)}\{-(k-1), \ldots, -1, 1, \ldots, (k-1)\} to each of its half edges such that Kirchhoff's law is respected, that is, the total incoming flow is equal to the total outgoing flow at each vertex. A signed graph is said to admit a nowhere-zero kk-flow if it has an orientation such that the corresponding bidirected graph admits a nowhere-zero kk-flow. It was conjectured by Bouchet that every signed graph admitting a nowhere-zero kk-flow for some integer k2k \ge 2 admits a nowhere-zero 6-flow. In this paper we prove that every 33-edge-connected signed graph admitting a nowhere-zero kk-flow for some kk admits a nowhere-zero 99-flow.

Cite

@article{arxiv.1508.04620,
  title  = {Nowhere-zero 9-flows in 3-edge-connected signed graphs},
  author = {Fan Yang and Sanming Zhou},
  journal= {arXiv preprint arXiv:1508.04620},
  year   = {2016}
}

Comments

This paper has been withdrawn by the authors due to an incomplete proof

R2 v1 2026-06-22T10:36:56.191Z