Oriented Diameter of Star Graphs
Abstract
An {\em orientation} of an undirected graph is an assignment of exactly one direction to each edge of . Converting two-way traffic networks to one-way traffic networks and bidirectional communication networks to unidirectional communication networks are practical instances of graph orientations. In these contexts minimising the diameter of the resulting oriented graph is of prime interest. The -star network topology was proposed as an alternative to the hypercube network topology for multiprocessor systems by Akers and Krishnamurthy [IEEE Trans. on Computers (1989)]. The -star graph consists of vertices, each labelled with a distinct permutation of . Two vertices are adjacent if their labels differ exactly in the first and one other position. is an -regular, vertex-transitive graph with diameter . Orientations of , called unidirectional star graphs and distributed routing protocols over them were studied by Day and Tripathi [Information Processing Letters (1993)] and Fujita [The First International Symposium on Computing and Networking (CANDAR 2013)]. Fujita showed that the (directed) diameter of this unidirectional star graph is at most . In this paper, we propose a new distributed routing algorithm for the same analysed by Fujita, which routes a packet from any node to any node at an undirected distance from using at most hops. This shows that the (directed) diameter of is at most . We also show that the diameter of is at least when , thereby showing that our upper bound is tight up to an additive factor.
Cite
@article{arxiv.1911.10340,
title = {Oriented Diameter of Star Graphs},
author = {K. S. Ajish Kumar and Deepak Rajendraprasad and K. S. Sudeep},
journal= {arXiv preprint arXiv:1911.10340},
year = {2019}
}
Comments
Full version of the paper to be presented in CALDAM 2020