Color degree and color neighborhood union conditions for long heterochromatic paths in edge-colored graphs
Abstract
Let G be an edge-colored graph. A heterochromatic (rainbow, or multicolored) path of G is such a path in which no two edges have the same color. Let dc(v) denote the color degree and CN(v) denote the color neighborhood of a vertex v of G. In a previous paper, we showed that if dc(v)≥ k (color degree condition) for every vertex v of G, then G has a heterochromatic path of length at least k+12, and if |CN(u) CN(v)|≥ s (color neighborhood union condition) for every pair of vertices u and v of G, then G has a heterochromatic path of length at least s3+1. Later, in another paper we first showed that if k≤ 7, G has a heterochromatic path of length at least k-1, and then, based on this we use induction on k and showed that if k≥ 8, then G has a heterochromatic path of length at least 3k5+1. In the present paper, by using a simpler approach we further improve the result by showing that if k≥ 8, G has a heterochromatic path of length at least 2k3+1, which confirms a conjecture by Saito. We also improve a previous result by showing that under the color neighborhood union condition, G has a heterochromatic path of length at least 2s+45.
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