Frustration indices of signed subcubic graphs

Abstract

The frustration index of a signed graph is defined as the minimum number of negative edges among all switching-equivalent signatures. This can be regarded as a generalization of the classical Max-Cut problem in graphs, as the Max-Cut problem is equivalent to determining the frustration index of signed graphs with all edges being negative signs. In this paper, we prove that the frustration index of an n-vertex signed connected simple subcubic graph, other than (K4, -), is at most 3n + 28, and we characterize the family of signed graphs for which this bound is attained. This bound can be further improved to n3 for signed 2-edge-connected simple subcubic graphs, with the exceptional signed graphs being characterized. As a corollary, every signed 2-edge-connected simple cubic graph on at least 10 vertices and with m edges has its frustration index at most 29m, where the upper bound is tight as it is achieved by an infinite family of signed cubic graphs.

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