WDM and Directed Star Arboricity

Abstract

A digraph is m-labelled if every arc is labelled by an integer in \1, …,m\. Motivated by wavelength assignment for multicasts in optical networks, we introduce and study n-fibre colourings of labelled digraphs. These are colourings of the arcs of D such that at each vertex v, and for each colour α, in(v,α)+out(v,α)≤ n with in(v,α) the number of arcs coloured α entering v and out(v,α) the number of labels l such that there is at least one arc of label l leaving v and coloured with α. The problem is to find the minimum number of colours λn(D) such that the m-labelled digraph D has an n-fibre colouring. In the particular case when D is 1-labelled, λ1(D) is called the directed star arboricity of D, and is denoted by dst(D). We first show that dst(D)≤ 2-(D)+1, and conjecture that if -(D)≥ 2, then dst(D)≤ 2-(D). We also prove that for a subcubic digraph D, then dst(D)≤ 3, and that if +(D), -(D)≤ 2, then dst(D)≤ 4. Finally, we study λn(m,k)=\λn(D) D is m-labelled -(D)≤ k\. We show that if m≥ n, then mn kn + kn ≤ λn(m,k) ≤mn kn + kn + C m2 kn for some constant C. We conjecture that the lower bound should be the right value of λn(m,k).