Edge-graceful usual fan graphs
Abstract
A graph G with p vertices and q edges is said to be edge-graceful if its edges can be labeled from 1 through q, in such a way that the labels induced on the vertices by adding over the labels of incident edges modulo p are distinct. A known result under this topic is Lo's Theorem, which states that if a graph G with p vertices and q edges is edge-graceful, then p|(q2+q-p(p-1)2). This paper presents novel results on the edge-gracefulness of the usual fan graphs. Using Lo's Theorem, the concepts of divisibility and Diophantine equations, and a computer program created, we determine all edge-graceful usual fan graphs F1,n with their corresponding edge-graceful labels.
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