On the local metric dimension of K4-free graphs
Abstract
Let G be a graph of order n(G) , local metric dimension l(G) , and clique number ω(G) . It has been conjectured that if n(G) ≥ ω(G) + 1 ≥ 4 , then l(G) ≤ ( ω(G) - 2ω(G) - 1 ) n(G) . In this paper the conjecture is confirmed for the case ω(G) = 3 . Consequently, a problem regarding the local metric dimension of planar graphs is also resolved.
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