DocumentCode
2998875
Title
A Self-stabilizing Algorithm for the Maximal 2-packing in a Cactus Graph
Author
Trejo-S´nchez, J.A. ; Fern´ndez-Zepeda, J.A.
Author_Institution
Dept. of Basic Sci., Univ. del Caribe, Cancun, Mexico
fYear
2012
fDate
21-25 May 2012
Firstpage
863
Lastpage
871
Abstract
In this paper we present a time optimal self-stabilizing algorithm for the maximal 2-packing in a cactus graph. The cactus is a network topology such that any edge belongs to at most one cycle. The cactus has important applications in telecommunication networks, location problems, biotechnology, among others. The execution time of this algorithm is proportional to the diameter of the cactus. To the best of our knowledge, this algorithm outperforms current algorithms presented in the literature for this problem and in this topology.
Keywords
bin packing; graph theory; network theory (graphs); biotechnology; cactus graph; location problems; maximal 2-packing; network topology; telecommunication networks; time optimal self-stabilizing algorithm; Algorithm design and analysis; Boolean functions; Color; Hafnium; Heuristic algorithms; Nominations and elections; Topology; 2-packing set; cactus graph; self-stabilization;
fLanguage
English
Publisher
ieee
Conference_Titel
Parallel and Distributed Processing Symposium Workshops & PhD Forum (IPDPSW), 2012 IEEE 26th International
Conference_Location
Shanghai
Print_ISBN
978-1-4673-0974-5
Type
conf
DOI
10.1109/IPDPSW.2012.106
Filename
6270729
Link To Document