English

WDM and Directed Star Arboricity

Networking and Internet Architecture 2010-07-16 v3 Combinatorics

Abstract

A digraph is mm-labelled if every arc is labelled by an integer in {1,,m}\{1, \dots,m\}. Motivated by wavelength assignment for multicasts in optical networks, we introduce and study nn-fibre colourings of labelled digraphs. These are colourings of the arcs of DD such that at each vertex vv, and for each colour α\alpha, in(v,α)+out(v,α)nin(v,\alpha)+out(v,\alpha)\leq n with in(v,α)in(v,\alpha) the number of arcs coloured α\alpha entering vv and out(v,α)out(v,\alpha) the number of labels ll such that there is at least one arc of label ll leaving vv and coloured with α\alpha. The problem is to find the minimum number of colours λn(D)\lambda_n(D) such that the mm-labelled digraph DD has an nn-fibre colouring. In the particular case when DD is 11-labelled, λ1(D)\lambda_1(D) is called the directed star arboricity of DD, and is denoted by dst(D)dst(D). We first show that dst(D)2Δ(D)+1dst(D)\leq 2\Delta^-(D)+1, and conjecture that if Δ(D)2\Delta^-(D)\geq 2, then dst(D)2Δ(D)dst(D)\leq 2\Delta^-(D). We also prove that for a subcubic digraph DD, then dst(D)3dst(D)\leq 3, and that if Δ+(D),Δ(D)2\Delta^+(D), \Delta^-(D)\leq 2, then dst(D)4dst(D)\leq 4. Finally, we study \lambda_n(m,k)=\max\{\lambda_n(D) \tq D \mbox{is m-labelled} \et \Delta^-(D)\leq k\}. We show that if mnm\geq n, then \dsmnkn+knλn(m,k)mnkn+kn+Cm2logkn\ds \left\lceil\frac{m}{n}\left\lceil \frac{k}{n}\right\rceil + \frac{k}{n} \right\rceil\leq \lambda_n(m,k) \leq\left\lceil\frac{m}{n}\left\lceil \frac{k}{n}\right\rceil + \frac{k}{n} \right\rceil + C \frac{m^2\log k}{n} for some constant CC. We conjecture that the lower bound should be the right value of λn(m,k)\lambda_n(m,k).

Keywords

Cite

@article{arxiv.0705.0315,
  title  = {WDM and Directed Star Arboricity},
  author = {Omid Amini and Frederic Havet and Florian Huc and Stephan Thomasse},
  journal= {arXiv preprint arXiv:0705.0315},
  year   = {2010}
}
R2 v1 2026-06-21T08:24:18.658Z