English

Flow Extensions and Group Connectivity with Applications

Combinatorics 2020-05-04 v1

Abstract

We study the flow extension of graphs, i.e., pre-assigning a partial flow on the edges incident to a given vertex and aiming to extend to the entire graph. This is closely related to Tutte's 33-flow conjecture(1972) that every 44-edge-connected graph admits a nowhere-zero 33-flow and a Z3\mathbb{Z}_3-group connectivity conjecture(3GCC) of Jaeger, Linial, Payan, and Tarsi(1992) that every 55-edge-connected graph GG is Z3\mathbb{Z}_3-connected. Our main results show that these conjectures are equivalent to their natural flow extension versions and present some applications. The 33-flow case gives an alternative proof of Kochol's result(2001) that Tutte's 33-flow conjecture is equivalent to its restriction on 55-edge-connected graphs and is implied by the 3GCC. It also shows a new fact that Gr{\"o}tzsch's theorem (that triangle-free planar graphs are 33-colorable) is equivalent to its seemly weaker girth five case that planar graphs of grith 55 are 33-colorable. Our methods allow to verify 3GCC for graphs with crossing number one, which is in fact reduced to the planar case proved by Richter, Thomassen and Younger(2017). Other equivalent versions of 3GCC and related partial results are obtained as well.

Keywords

Cite

@article{arxiv.2005.00297,
  title  = {Flow Extensions and Group Connectivity with Applications},
  author = {Jiaao Li},
  journal= {arXiv preprint arXiv:2005.00297},
  year   = {2020}
}

Comments

12 pages,3 figures. to appear in European Journal of Combinatorics

R2 v1 2026-06-23T15:14:12.836Z