Abstract.
In this paper we study the Steiner minimal tree T problem for a point set Z with cardinality n and one polygonal obstacle ω in the Euclidean plane. We assume ω touches only one convex path in T that joins two terminals and that the number of extreme points of the obstacle is k . If all degree 2 vertices are omitted, then the topology of T is called the primitive topology of T . Given a full primitive topology along with ω convex, we prove that T can be determined in O(n 2 +nlog 2 k) time. Further, if ω is nonconvex, we then show that O(n 2 +nklog k) time is required.
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Received April 16, 1996; revised August 18, 1997.
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Weng, J., MacGregor Smith, J. Steiner Minimal Trees with One Polygonal Obstacle. Algorithmica 29, 638–648 (2001). https://doi.org/10.1007/s00453-001-0002-1
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DOI: https://doi.org/10.1007/s00453-001-0002-1