Finiteness of non-decomposable critically 4 and 5-frustrated signed graphs

Abstract

A signed graph (G,σ) is a graph G with a signature σ labeling each edge with a positive or negative sign. Two signatures of G are switching equivalent if one is obtained from the other by changing the signs of all edges in an edge-cut. The frustration index of a signed graph (G, σ) is the minimum number of negative edges among all signatures equivalent to σ. A signed graph is critically k-frustrated if it has frustration index k, and the removal of any edge decreases its frustration index. A critically k-frustrated signed graph is prime if it has no subdivided edge (including multiedge) and none of its subgraphs is the edge-disjoint union of critically frustrated signed graphs. Steffen and Naserasr et al. conjectured that for any positive integer k, there are finitely many prime critically k-frustrated signed graphs. The cases k=1,2,3 have been proved to be true recently by Cappello et al.. In this paper, we show that the conjecture holds when k=4 and 5.

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