On Shortest k-Edge-Connected Steiner Networks in Metric Spaces
Research output: Journal Publications and Reviews (RGC: 21, 22, 62) › 21_Publication in refereed journal › peer-review
Author(s)
Related Research Unit(s)
Detail(s)
| Original language | English |
|---|---|
| Pages (from-to) | 99-107 |
| Journal / Publication | Journal of Combinatorial Optimization |
| Volume | 4 |
| Issue number | 1 |
| Publication status | Published - 2000 |
Link(s)
Abstract
Given a set of points P in a metric space, let lk (P) denote the ratio of lengths between the shortest k-edge-connected Steiner network and the shortest k-edge-connected spanning network on P, and let rk = inf{lk(P)|P} for k ≥ 1. In this paper, we show that in any metric space, rk ≥ 3/4 for k ≥ 2, and there exists a polynomial-time α-approximation for the shortest k-edge-connected Steiner network, where α = 2 for even k and α = 2 + 4/(3k) for odd k. In the Euclidean plane, rk ≥ √3/2, r3 ≤ (√3+2)/4 and r4 ≤ (7+3√3)/(9+2√3).
Research Area(s)
- K-edge-connectivity, Spanning networks, Steiner networks, Steiner ratio
Citation Format(s)
On Shortest k-Edge-Connected Steiner Networks in Metric Spaces. / Du, Xiufeng; Hu, Xiaodong; Jia, Xiaohua.
In: Journal of Combinatorial Optimization, Vol. 4, No. 1, 2000, p. 99-107.
In: Journal of Combinatorial Optimization, Vol. 4, No. 1, 2000, p. 99-107.
Research output: Journal Publications and Reviews (RGC: 21, 22, 62) › 21_Publication in refereed journal › peer-review
