WDM and Directed Star Arboricity
Abstract
A digraph is -labelled if every arc is labelled by an integer in . Motivated by wavelength assignment for multicasts in optical networks, we introduce and study -fibre colourings of labelled digraphs. These are colourings of the arcs of such that at each vertex , and for each colour , with the number of arcs coloured entering and the number of labels such that there is at least one arc of label leaving and coloured with . The problem is to find the minimum number of colours such that the -labelled digraph has an -fibre colouring. In the particular case when is -labelled, is called the directed star arboricity of , and is denoted by . We first show that , and conjecture that if , then . We also prove that for a subcubic digraph , then , and that if , then . 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 , then for some constant . We conjecture that the lower bound should be the right value of .
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}
}