| Summary: | An edge-graceful labeling of a finite simple graph with vertices and edges is a bijection from the set of edges to the set of integers such that the vertex sums are pairwise distinct modulo , where the vertex sum at a vertex is the sum of labels of all edges incident to such vertex. A graph is called edge-graceful if it admits an edge-graceful labeling. In 2005 Hefetz (2005) proved that a regular graph of even degree is edge-graceful if it contains a 2-factor consisting of , where are odd. In this article, we show that a regular graph of odd degree is edge-graceful if it contains either of two particular 3-factors, namely, a claw factor and a quasi-prism factor. We also introduce a new notion called edge-graceful deficiency, which is a parameter to measure how close a graph is away from being an edge-graceful graph. In particular the edge-graceful deficiency of a regular graph of even degree containing a Hamiltonian cycle is completely determined.
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