Even Vertex Tetrahedral Mean Graphs

ABSTRACT The nth tetrahedral number is denoted by 𝑇𝑛 and is of the form 𝑇𝑛 = 1/6𝑛 (𝑛+1) (𝑛+2). A graph G with p vertices and q edges is said to have an even vertex tetrahedral mean labeling if there exists an injective function f: V(G) →{0, 2, 4, . . . , 2𝑇𝑞-2 , 2𝑇𝑞} such that the induced edge function 𝑓∗: E(G) →{𝑇1,𝑇2 , . . . ,𝑇𝑞} defined by 𝑓∗(uv) = (𝑓(𝑢)+ 𝑓(𝑣))/2 ∀ e=uv∈E(G) is a bijection. A graph which admits even vertex tetrahedral mean labeling is called an even vertex tetrahedral mean graph. In this paper, we introduce even vertex tetrahedral mean labeling and we prove that path, star, bistar, coconut tree, caterpillar, shrub, 𝑃𝑚 @ 𝑃𝑛, banana tree, Y- tree and F-tree are even vertex tetrahedral mean graphs. References Apostal, Introduction to Analytic Number Theory, Narosa Publishing House, Second Edition, 1991. Arockiaraj and B. S. Mahadevesaswamy, Even vertex odd mean labeling of graphs obtained from graph operations. International Journal of Advance Research in Edu. 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Namasivayam, M. P. Syed Ali Nisaya. Some Results on Centered Triangular Sum Graphs. World Scientific News 155 (2021) 113-128 Vanu Esakki, M. P. Syed Ali Nisaya, Some Results on Two Modulo Three Sum Graphs. Journal of Xidian University, 14(9) (2020) 1090-1099 Download all article in PDF WSN 156 (2021) 26-39

Authors: A. Fathima Banu, S. Chelliah, M. P. Syed Ali Nisaya, 156 (2021) 26-39

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Even Vertex Tetrahedral Mean Graphs

Authors: A. Fathima Banu, S. Chelliah, M. P. Syed Ali Nisaya, 156 (2021) 26-39

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