Title :
Optimal Path Cover for Graphs of Small Treewidth
Author :
Nie, Zhe ; Li, Yueping ; Zhou, Xiaohong
Author_Institution :
Sch. of Electron. & Inf. Eng., Shenzhen Polytech., Shenzhen
Abstract :
This paper studies the optimal path cover problem in graphs of small treewidth. Let G=(V, E) be a graph modeled by network with vertex set V and edge set E. Given a specified vertex set SVsubeV(G), a path cover is a path P of G such that SVsubeV(P). A path cover PC is optimal if the cost of PC is minimum. Optimal path cover problem is essential in the route design, especially, when the group broadcast is applied. Optimal path cover problem is NP-hard in general graphs. Since the graph representing the modern communication network has small treewidth, we restrict the problem in small treewidth graphs. Suppose the treewidth of G is k. We present an algorithm for the optimal path cover problem. Its time complexity isO(|V|2k*k!) in the worst case.
Keywords :
computational complexity; network theory (graphs); set theory; trees (mathematics); NP-hard problem; communication network; group broadcast; optimal path cover problem; set theory; small treewidth graph; time complexity; Broadcasting; Communication networks; Computer networks; Cost function; Information management; Local area networks; Network topology; Polynomials; Terminology; Tree graphs; algorithm; path cover; route design; treewidth;
Conference_Titel :
Networked Computing and Advanced Information Management, 2008. NCM '08. Fourth International Conference on
Conference_Location :
Gyeongju
Print_ISBN :
978-0-7695-3322-3
DOI :
10.1109/NCM.2008.205
