k-colored kernels

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Abstract

We study k-colored kernels in m-colored digraphs. An m-colored digraph D has k-colored kernel if there exists a subset K of its vertices such that (i) from every vertex v@?K there exists an at most k-colored directed path from v to a vertex of K and (ii) for every u,v@?K there does not exist an at most k-colored directed path between them. In this paper, we prove that for every integer k=2 there exists a (k+1)-colored digraph D without k-colored kernel and if every directed cycle of an m-colored digraph is monochromatic, then it has a k-colored kernel for every positive integer k. We obtain the following results for some generalizations of tournaments: 1. m-colored quasi-transitive and 3-quasi-transitive digraphs have a k-colored kernel for every k=3 and k=4, respectively (we conjecture that every m-colored l-quasi-transitive digraph has a k-colored kernel for every k=l+1), and 2. m-colored locally in-tournament (out-tournament, respectively) digraphs have ak-colored kernel provided that every arc belongs to a directed cycle and every directed cycle is at most k-colored.