| z (2007) | |||||||||||||||
Abstract | |||||||||||||||
| The Steiner tree problem in weighted graphs seeks a minimum weight connected subgraph containing a given subset of the vertices (terminals). We present a new polynomial-time heuristic with an approximation ratio approaching 1 + ln 3 2 1:55, which improves upon the previously best-known approximation algorithm of [10] with performance ratio 1:59. In quasi-bipartite graphs (i.e., in graphs where all non-terminals are pairwise disjoint), our algorithm achieves an approximation ratio of 1:28, whereas the previously best method achieves an approximation ratio approaching 1:5 [19]. For complete graphs with edge weights 1 and 2, we show that our heuristic has an approximation ratio approaching 1:28, which improves upon the previously best-known ratio of 4 3 [4]. Our method is considerably simpler and easier to implement than previous approaches. Our techniques can also be used to prove that the Iterated 1-Steiner heuristic [14] achieves an approximation ratio of 1:5 in quasi-bipartite graphs, thus providing the first known non-trivial performance ratio of this well-known method. 1 | |||||||||||||||
Publication details | |||||||||||||||
| |||||||||||||||