Complexity results on the decomposition of a digraph into directed linear forests and out-stars

Abstract

We consider two decomposition problems in directed graphs. We say that a digraph is k-bounded for some k ∈ Z≥ 1 if each of its connected components contains at most k arcs. For the first problem, a directed linear forest is a collection of vertex-disjoint directed paths and we consider the problem of decomposing a given digraph into a k-bounded and an -bounded directed linear forest for some fixed k, ∈ Z≥ 1 \∞\. We give a full dichotomy for this problem by showing that it can be solved in polynomial time if k+ ≤ 3 and is NP-complete otherwise. This answers a question of Campbell, H\"orsch, and Moore. For the second problem, we say that an out-galaxy is a vertex-disjoint collection of out-stars. Again, we give a full dichotomy of when a given digraph can be edge-decomposed into a k-bounded and an -bounded out-galaxy for fixed k, ∈ Z≥ 1 \∞\. More precisely, we show that the problem can be solved in polynomial time if \k,\∈ \1,∞\ and is NP-complete otherwise.