Total Difference Labeling of Regular Infinite Graphs
Abstract
Given a graph G, a k-total difference labeling of the graph is a total labeling f from the set of edges and vertices to the set \1, 2, ·s k\ satisfying that for any edge \u,v\, f(\u,v\)=|f(u)-f(v)|. If G is a graph, then td(G) is the minimum k such that there is a k-total difference labeling of G in which no two adjacent labels are identical. We extend prior work on total difference labeling by improving the upper bound on td(Kn) and also by proving results concerning infinite regular graphs.
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