Abstract
Let S be a set of n points in ℜd. We present an algorithm that uses the well-separated pair decomposition and computes the minimum spanning tree of S under any Lp or polyhedral metric. A theoretical analysis shows that it has an expected running time of O(n log n) for uniform point distributions; this is verified experimentally. Extensive experimental results show that this approach is practical. Under a variety of input distributions, the resulting implementation is robust and performs well for points in higher dimensional space.
Original language | English |
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Journal | ACM Journal of Experimental Algorithmics |
ISSN | 1084-6654 |
Publication status | Published - 2001 |
Externally published | Yes |
Keywords
- Minimum Spanning Tree (MST)
- Well-Separated Pair Decomposition (WSPD)
- L^p Metrics
- Polyhedral Metrics
- Algorithm Analysis