Circuit Covers of Cubic Signed Graphs

Abstract

A signed graph is a graph G associated with a mapping σ: E(G) \-1,+1\, denoted by (G,σ). A cycle of (G,σ) is a connected 2-regular subgraph. A cycle C is positive if it has an even number of negative edges, and negative otherwise. A circuit of of a signed graph (G,σ) is a positive cycle or a barbell consisting of two edge-disjoint negative cycles joined by a path. The definition of a circuit of signed graph comes from the signed-graphic matroid. A circuit cover of (G,σ) is a family of circuits covering all edges of (G,σ). A circuit cover with the smallest total length is called a shortest circuit cover of (G,σ) and its length is denoted by scc(G,σ). Bouchet proved that a signed graph with a circuit cover if and only if it is flow-admissible (i.e., has a nowhere-zero integer flow). M\'acajov\'a et. al. show that a 2-edge-connected signed graph (G,σ) has scc(G,σ) 9 |E(G)| if it is flow-admissible. This bound was improved recently by Cheng et. al. to scc(G,σ) 11|E(G)|/3 for 2-edge-connected signed graphs with even negativeness, and particularly, scc(G,σ) 3|E(G)|+ε(G,σ)/3 for 2-edge-connected cubic signed graphs with even negativeness (where ε(G,σ) is the negativeness of (G,σ)). In this paper, we show that every 2-edge-connected cubic signed graph has scc(G,σ) 26|E(G)|/9 if it is flow-admissible, and scc(G,σ) 23|E(G)|/9 if it has even negativeness.