Claw-free cubic graphs and zero forcing

Abstract

A claw-free cubic graph is a cubic graph with no induced subgraph isomorphic to K1,3. The zero forcing process begins with an initial set S of colored vertices. At each step, a colored vertex with exactly one uncolored neighbor forces that neighbor to become colored. If repeated applications of this rule color every vertex of G, then S is called a zero forcing set. The minimum cardinality of a zero forcing set is the zero forcing number, denoted by Z(G). In this paper, we answer three open questions posed by Davila and Henning concerning upper bounds on the zero forcing number of claw-free cubic graphs. We characterize the connected claw-free cubic graphs satisfying Z(G)=α(G)+1, where α(G) is the independence number. In addition, we establish the improved upper bound Z(G)≤ T2+D+2 for claw-free cubic graphs with Hamiltonian contraction multigraphs, where D is the number of diamonds and T is the number of triangles in G.

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