On 3-flow-critical graphs

Abstract

A bridgeless graph G is called 3-flow-critical if it does not admit a nowhere-zero 3-flow, but G/e has for any e∈ E(G). Tutte's 3-flow conjecture can be equivalently stated as that every 3-flow-critical graph contains a vertex of degree three. In this paper, we study the structure and extreme edge density of 3-flow-critical graphs. We apply structure properties to obtain lower and upper bounds on the density of 3-flow-critical graphs, that is, for any 3-flow-critical graph G on n vertices, 8n-25 |E(G)| 4n-10, where each equality holds if and only if G is K4. We conjecture that every 3-flow-critical graph on n 7 vertices has at most 3n-8 edges, which would be tight if true. For planar graphs, the best possible density upper bound of 3-flow-critical graphs on n vertices is 5n-82, known from a result of Kostochka and Yancey (JCTB 2014) on vertex coloring 4-critical graphs by duality.