Karl Schaffer
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View article: Every graph is local antimagic total and its applications
Every graph is local antimagic total and its applications Open
Let \(G = (V,E)\) be a simple graph of order \(p\) and size \(q\). A graph \(G\) is called local antimagic (total) if \(G\) admits a local antimagic (total) labeling. A bijection \(g : E \to \{1,2,\ldots,q\}\) is called a local antimagic l…