On the existence of 3- and 4-kernels in digraphs

Abstract

Let D = (V(D), A(D)) be a digraph. A subset S ⊂eq V(D) is k-independent if the distance between every pair of vertices of S is at least k, and it is -absorbent if for every vertex u in V(D) S there exists v ∈ S such that the distance from u to v is less than or equal to . A k-kernel is a k-independent and (k-1)-absorbent set. A kernel is simply a 2-kernel. A classical result due to Duchet states that if every directed cycle in a digraph D has at least one symmetric arc, then D has a kernel. We propose a conjecture generalizing this result for k-kernels and prove it true for k = 3 and k = 4.