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Let \ (G\) be a \ ( (p, q) \) graph. Let \ (f: V (G) \1, 2, , k\\) be a map where \ (k N\) is a variable and \ (k > 1\). For each edge \ (uv\), assign the label \ ( (f (u), f (v) ) \). \ (f\) is called \ (k\) -Total prime cordial labeling of \ (G\) if \ (|t₅ (i) – t₅ (j) | 1\), \ (i, j \1, 2, , k\\) where \ (t₅ (x) \) denotes the total number of vertices and edges labeled with \ (x\). A graph with a \ (k\) -total prime cordial labeling is called \ (k\) -total prime cordial graph. In this paper, we investigate the 4-total prime cordial labeling of some graphs like dragon, Möbius ladder, and corona of some graphs.
Ponraj et al. (Sun,) studied this question.
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