Acyclic dichromatic number of oriented graphs
Abstract
The dichromatic number (D) of a digraph D=(V,A) is the minimum number of sets in a partition V1,…,Vk of V into k subsets so that the induced subdigraph D[Vi] is acyclic for each i∈ [k]. This is a generalization of the chromatic number for undirected graphs as a graph has chromatic number at most k if and only if the complete biorientation of G (replace each edge by a directed 2-cycle) has dichromatic number at most k. In this paper we introduce the acyclic dichromatic number a(D) of a digraph D as the minimum number of sets in a partition V1,…,Vk of V so that the induced subdigraph D[Vi] is acyclic for each i∈ [k] and each of the bipartite induced subdigraphs D[Vi,Vj] is acyclic for each 1≤ i<j≤ k. This parameter, which resembles the definition of acyclic chromatic number for undirected graphs, has apparently not been studied before. We derive a number of results which display the difference between the dichromatic number and the acyclic dichromatic number, in particular, there are digraphs D with arbitrarily large a(D)-(D), even among tournaments with dichromatic number 2 and bipartite tournaments (where the dichromatic number is always 2). We prove several complexity results, including that deciding whether a(D)≤ 2 is NP-complete already for bipartite digraphs, while it is polynomial for tournaments (contrary to the case for dichromatic number). We also generalize the concept of heroes of a tournament to acyclic heroes of tournaments.
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