Sciweavers

JDA
2006

Partitioning a graph of bounded tree-width to connected subgraphs of almost uniform size

14 years 12 days ago
Partitioning a graph of bounded tree-width to connected subgraphs of almost uniform size
Assume that each vertex of a graph G is assigned a nonnegative integer weight and that l and u are nonnegative integers. One wishes to partition G into connected components by deleting edges from G so that the total weight of each component is at least l and at most u. Such an "almost uniform" partition is called an (l,u)-partition. We deal with three problems to find an (l,u)-partition of a given graph; the minimum partition problem is to find an (l,u)-partition with the minimum number of components; the maximum partition problem is defined analogously; and the p-partition problem is to find an (l,u)-partition with a fixed number p of components. All these problems are NP-complete or NP-hard, respectively, even for series-parallel graphs. In this paper we show that both the minimum partition problem and the maximum partition problem can be solved in time O(u4n) and the p-partition problem can be solved in time O(p2u4n) for any series-parallel graph with n vertices. The algo...
Takehiro Ito, Xiao Zhou, Takao Nishizeki
Added 13 Dec 2010
Updated 13 Dec 2010
Type Journal
Year 2006
Where JDA
Authors Takehiro Ito, Xiao Zhou, Takao Nishizeki
Comments (0)