Title :
A Self-Stabilizing (Δ+ 1)- Edge-Coloring Algorithm of Arbitrary Graphs
Author :
Drira, Kaouther ; Dekar, Lyes ; Kheddouci, Hamamache
Author_Institution :
Lab. LIESP, Univ. Claude Bernard Lyon 1, Villeurbanne, France
Abstract :
Given a graph G = (V, E), an edge-coloring of G is a function from the set of edges E to colors {1, 2. .., k} such that any two adjacent edges are assigned different colors. In this paper, we propose a self-stabilizing edge-coloring algorithm in a polynomial number of moves. The protocol assumes the unfair central dÿmon and the coloring is a (Δ + 1)-edge-coloring of G, where Δ is the maximum degree in G. To our knowledge, we give the first self-stabilizing edge-coloring algorithm using (Δ + 1) colors of arbitrary graphs.
Keywords :
graph colouring; arbitrary graphs; polynomial number; self stabilizing edge coloring algorithm; Color; Distributed algorithms; Distributed computing; Labeling; Network topology; Polynomials; Protocols; Scheduling algorithm; Tree graphs; Upper bound;
Conference_Titel :
Parallel and Distributed Computing, Applications and Technologies, 2009 International Conference on
Conference_Location :
Higashi Hiroshima
Print_ISBN :
978-0-7695-3914-0
DOI :
10.1109/PDCAT.2009.71
