%0 Journal Article
%T Z4p- Magic labeling for some special graphs
%A V.L. Stella Arputha Mary
%A S. Navaneethakrishnan
%A A. Nagarajan
%J International Journal of Mathematics and Soft Computing
%D 2013
%I SweDha Publication
%X For any non-trivial abelian group $A$ under addition a graph $G$ is saidto be $A-$ magic if there exists a labeling $f$ of the edges of $G$ withnon zero elements of $A$ such that, the vertex labeling $f^+$ defined as $f^+(v)= Sigma f(uv)$ taken over all edges $uv$ incident at $v$ is a constant cite {rm}. A graph is said to be $A$-magic if it admits an $A$-magic labeling. In this paper we prove that splitting graph of a path, triangular snake and book graphs are $Z_4$-magic graphs. Also we generalize that they are all $Z_{4p}$-magic graphs for any positive integer $p$.
%K A - magic labeling
%K $Z_4$ - magic labeling
%K $Z_{4p}$ -magic labeling
%K $Z_{4p}$-magic graphs
%U http://ijmsc.com/index.php/ijmsc/article/view/IJMSC070/3-3-9