A note on the 4-girth-thickness of Kn,n,n
Abstract
The 4-girth-thickness θ(4,G) of a graph G is the minimum number of planar subgraphs of girth at least four whose union is G. In this paper, we obtain that the 4-girth-thickness of complete tripartite graph Kn,n,n is n+12 except for θ(4,K1,1,1)=2. And we also show that the 4-girth-thickness of the complete graph K10 is three which disprove the conjecture θ(4,K10)=4 posed by Rubio-Montiel (Ars Math Contemp 14(2) (2018) 319).
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