Non-conflicting no-where zero Z2× Z2 flows in cubic graphs

Abstract

Let Z2× Z2=\0, α, β, α+β\. If G is a bridgeless cubic graph, F is a perfect matching of G and F is the complementary 2-factor of F, then a no-where zero Z2× Z2-flow θ of G/F is called non-conflicting with respect to F, if F contains no edge e=uv, such that u is incident to an edge with θ-value α and v is incident to an edge with θ-value β. In this paper, we demonstrate the usefulness of non-conflicting flows by showing that if a cubic graph G admits such a flow with respect to some perfect matching F, then G admits a normal 6-edge-coloring. We use this observation in order to show that claw-free bridgeless cubic graphs, bridgeless cubic graphs possessing a 2-factor having at most two cycles admit a normal 6-edge-coloring. We demonstrate the usefulness of non-conflicting flows further by relating them to a recent conjecture of Thomassen about edge-disjoint perfect matchings in highly connected regular graphs. In the end of the paper, we construct infinitely many 2-edge-connected cubic graphs such that G/F does not admit a non-conflicting no-where zero Z2× Z2-flow with respect to any perfect matching F.

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