Cut covers of acyclic digraphs

Abstract

A cut in a digraph D=(V,A) is a set of arcs \uv ∈ A: u∈ U, v U\, for some U⊂eq V. It is known that the arc set A is covered by k cuts if and only if it admits a k-coloring such that no two consecutive arcs uv, vw receive the same color. Alon, Bollob\'as, Gy\'arf\'as, Lehel and Scott (2007) observed that every acyclic digraph of maximum indegree at most k k/2 -1 is covered by k cuts. We prove that this degree condition is best possible (if an enormous outdegree is allowed). Notably, for k≥ 5, powers of directed paths do not suffice as extremal examples. Instead, we locate the maximum d such that the d-th power of an arbitrarily long directed path is covered by k cuts between (1-o(1)) 1e 2k and 122k-2. Let k≥ 3 and D be an acyclic digraph that is not covered by k cuts. We prove that the decision problem whether a digraph that admits a homomorphism to D is covered by k cuts is NP-complete. If k=3 and D is the third power of the directed path on 12 vertices, then even the restriction to planar digraphs of maximum indegree and outdegree 3 holds.

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