论文信息 - Getting around a lower bound for the minimum Hausdorff distance

Getting around a lower bound for the minimum Hausdorff distance

Abstract We consider the following geometric pattern matching problem: find the minimum Hausdorff distance between two point sets under translation with L 1 or L ∞ as the underlying metric. Huttenlocher, Kedem and Sharir have shown that this minimum distance can be found by constructing the upper envelope of certain Voronoi surfaces. Further, they show that if the two sets are each of cardinality n then the complexity of the upper envelope of such surfaces is Ω(n 3 ) . We examine the question of whether one can get around this cubic lower bound, and show that under the L 1 and L ∞ metrics, the time to compute the minimum Hausdorff distance between two point sets is O( n 2 log 2 n ).

Klara Kedem | L. Paul Chew | K. Kedem | L. Paul Chew

[1] Mark H. Overmars,et al. New Upper Bounds in Klee's Measure Problem , 1991, SIAM J. Comput..

[2] Sivan Toledo,et al. Applications of parametric searching in geometric optimization , 1992, SODA '92.

[3] Alon Efrat,et al. Geometric Pattern Matching in d-Dimensional Space , 1995, ESA.

[4] Daniel P. Huttenlocher,et al. Computing the minimum Hausdorff distance for point sets under translation , 1990, SCG '90.

[5] Donald B. Johnson,et al. Finding k-th Paths and p-Centers by Generating and Searching Good Data Structures , 1983, J. Algorithms.

[6] Micha Sharir,et al. The upper envelope of voronoi surfaces and its applications , 1993, Discret. Comput. Geom..

[7] Micha Sharir,et al. On the union of Jordan regions and collision-free translational motion amidst polygonal obstacles , 1986, Discret. Comput. Geom..

[8] Kurt Mehlhorn,et al. Data Structures and Algorithms 3: Multi-dimensional Searching and Computational Geometry , 2012, EATCS Monographs on Theoretical Computer Science.

[9] Greg N. Frederickson,et al. Optimal algorithms for tree partitioning , 1991, SODA '91.