Please use this identifier to cite or link to this item: http://hdl.handle.net/20.500.11861/7681
Title: On orientation metric and Euclidean Steiner tree constructions
Authors: Li Y.Y. 
Prof. LEUNG Kwong Sak 
Wong C.K. 
Issue Date: 1998
Publisher: IEEE
Source: Proceedings - IEEE International Symposium on Circuits and Systems, 1998, vol. 6, pp. 241 - 243
Journal: Proceedings - IEEE International Symposium on Circuits and Systems 
Abstract: We consider Steiner minimal trees (SMT) in the plane, where only orientations with angle iπ/σ, 0≤i≤σ-1 and σ an integer, are allowed. The orientations define a metric, called the orientation metric, λσ, in a natural way. In particular, λ2 metric is the rectilinear metric and the Euclidean metric can be regarded as λ∞ metric. In this paper, we provide a method to find an optimal λσ SMT for 3 or 4 points by analyzing the topology of λσ SMT's in great details. Utilizing these results and based on the idea of loop detection first proposed in, we further develop an O(n2) time heuristic for the general λσ SMT problem, including the Euclidean metric. Experiments performed on publicly available benchmark data for 12 different metrics, plus the Euclidean metric, demonstrate the efficiency of our algorithms and the quality of our results.
Type: Conference Proceedings
URI: http://hdl.handle.net/20.500.11861/7681
ISSN: 02714310
Appears in Collections:Applied Data Science - Publication

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