Square Difference Edge Cordial Labeling Of Some Special Graphs

Authors

  • Kalamani D Professor, Department of Mathematics, Bharathiar University PG Extension and Research Center, Erode- 638052, Tamil Nadu, India.
  • Geetha T Research Scholar, Department of Mathematics, Bharathiar University PG Extension and Research Center, Erode- 638052, Tamil Nadu, India.

Keywords:

Square difference edge cordial labeling, Square difference edge cordial graph.

Abstract

A graph G with p vertices and q edges is said to admit a square difference edge cordial labeling if there is a bijectionf : V(G) →{1,2,..., p}such that for each edge e =uv, the induced map: E(G) →{0,1} is defined by(uv) = 1 if|| is odd, otherwise 0 and|(0)−(1)|≤1 where(0) = edges with label zero and(1) = edges with label one. If a graph admits square difference edge cordial labeling, then it is said to be square difference edge cordial graph. In this paper, it is investigated that the square graph, the shadow graph D2(Pn), the duplication of apex vertex of bistarBn,n, the lotus inside a circleLCn, the bistarBn,n, the one  point union of cycle C3 with the star graph K1,n(n is even), the graph [P n: S2], the comb graph, the jewel graphJn, the graph (Kn−e)nand the total graph T(Pn) are square difference edge cordial graph.

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Published

2024-09-07

How to Cite

Kalamani D, & Geetha T. (2024). Square Difference Edge Cordial Labeling Of Some Special Graphs. Journal of Computational Analysis and Applications (JoCAAA), 33(08), 823–832. Retrieved from https://eudoxuspress.com/index.php/pub/article/view/1460

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