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A graph G = (V, E), where | V (G) | = n and | E (G) | = m is said to be a distance magic graph if there is a bijection f: V (G) →1, 2, …, n such that the vertex weight w (u) =∑ v ∈ N (u) f (v) = k is constant and independent of u, where N (u) is an open neighborhood of the vertex u. The constant k is called a distance magic constant, the function f is called a distance magic labeling of the graph G and the graph which admits such a labeling is called a distance magic graph. In this paper, we present some results on distance magic labeling of Mycielskian graphs.
Pawar et al. (Sat,) studied this question.