Zero Forcing and Vertex Independence Number on Cubic and Subcubic Graphs

Abstract

Motivated by a conjecture from the automated conjecturing program TxGraffiti, in this paper the relationship between the zero forcing number, Z(G), and the vertex independence number, α(G), of cubic and subcubic graphs is explored. TxGraffiti conjectures that for all connected cubic graphs G, that are not K4, Z(G) ≤ α(G) + 1. This work uses decycling partitions of upper-embeddable graphs to show that almost all cubic graphs satisfy Z(G) ≤ α(G) + 2, provides an infinite family of cubic graphs where Z(G) = α(G) + 1, and extends known bounds to subcubic graphs.

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