On removable edge subsets in graphs with a nowhere-zero $4$-flow
Abstract
A set of a graph is -removable if has a nowhere-zero -flow. We prove that every graph admitting a nowhere-zero -flow has a -removable subset consisting of at most edges. This gives a positive answer to a conjecture of M. DeVos, J. McDonald, I. Pivotto, E. Rollov\'a and R. \v{S}\'amal [-Flows with large support, J. Comb. Theory Ser. B 144 (2020), 32-80] in the case of graphs admitting a nowhere-zero -flow. Moreover, Hoffmann-Ostenhof recently conjectured that every cubic graph with a nowhere-zero -flow has a -removable edge. Bipartite cubic graphs verify this conjecture. Our result gives an approximation for Hoffmann-Ostenhof's Conjecture in the non-bipartite case. Finally, for cubic graphs, our result implies that every -edge-colorable cubic graph contains a subgraph whose connected components are either cycles or subdivisions of bipartite cubic graphs, such that .
Cite
@article{arxiv.2511.01556,
title = {On removable edge subsets in graphs with a nowhere-zero $4$-flow},
author = {Davide Mattiolo},
journal= {arXiv preprint arXiv:2511.01556},
year = {2025}
}
Comments
6 pages