Tight minimum colored degree condition for rainbow connectivity
Abstract
Let G = (V, E) be a graph on n vertices, and let c: E P, where P is a set of colors. Let δc(G) = v ∈ V \ dc(v) \ where dc(v) is the number of colors on edges incident to a vertex v of G. In 2011, Fujita and Magnant showed that if G is a graph on n vertices that satisfies δc(G)≥ n/2, then for every two vertices u, v there is a properly-colored u,v-path in G. In this paper, we show that the same bound for δc(G) implies that any two vertices are connected by a rainbow path.
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