Approximating Minimum Steiner Point Trees in Minkowski Planes
Abstract
Given a set of points, we define a minimum Steiner point tree to be a tree interconnecting these points and possibly some additional points such that the length of every edge is at most 1 and the number of additional points is minimized. We propose using Steiner minimal trees to approximate minimum Steiner point trees. It is shown that in arbitrary metric spaces this gives a performance difference of at most , where is the number of terminals. We show that this difference is best possible in the Euclidean plane, but not in Minkowski planes with parallelogram unit balls. We also introduce a new canonical form for minimum Steiner point trees in the Euclidean plane; this demonstrates that minimum Steiner point trees are shortest total length trees with a certain discrete-edge-length condition.
Cite
@article{arxiv.1307.2987,
title = {Approximating Minimum Steiner Point Trees in Minkowski Planes},
author = {M. Brazil and C. J. Ras and D. A. Thomas},
journal= {arXiv preprint arXiv:1307.2987},
year = {2013}
}