Centerpoint (geometry)

In statistics and computational geometry, the notion of centerpoint is a generalization of the median to data in higher-dimensional Euclidean space. Given a set of points in d-dimensional space, a centerpoint of the set is a point such that any hyperplane that goes through that point divides the set of points in two roughly equal subsets: the smaller part should have at least a 1/(d + 1) fraction of the points. Like the median, a centerpoint need not be one of the data points. Every non-empty set of points (with no duplicates) has at least one centerpoint.

Related concepts

Closely related concepts are the Tukey depth of a point (the minimum number of sample points on one side of a hyperplane through the point) and a Tukey median of a point set (a point maximizing the Tukey depth). A centerpoint is a point of depth at least n/(d + 1), and a Tukey median must be a centerpoint, but not every centerpoint is a Tukey median. Both terms are named after John Tukey.

For a different generalization of the median to higher dimensions, see geometric median.

Existence

A simple proof of the existence of a centerpoint may be obtained using Helly's theorem. Suppose there are n points, and consider the family of closed half-spaces that contain more than dn/(d + 1) of the points. Fewer than n/(d + 1) points are excluded from any one of these halfspaces, so the intersection of any subset of d + 1 of these halfspaces must be nonempty. By Helly's theorem, it follows that the intersection of all of these halfspaces must also be nonempty. Any point in this intersection is necessarily a centerpoint.

Algorithms

For points in the Euclidean plane, a centerpoint may be constructed in linear time.^[1] In any dimension d, a Tukey median (and therefore also a centerpoint) may be constructed in time O(n^d − 1 + n log n).^[2]

A randomized algorithm that repeatedly replaces sets of d + 2 points by their Radon point can be used to compute an approximation to a centerpoint of any point set, in the sense that its Tukey depth is linear in the sample set size, in an amount of time that is polynomial in the dimension.^[3][4]

References

Citations

Sources

• "An optimal randomized algorithm for maximum Tukey depth", Proc. 15th ACM–SIAM Symp. on Discrete Algorithms (SODA 2004), 2004, pp. 430–436, http://portal.acm.org/citation.cfm?id=982792.982853 .
• "Approximating center points with iterated Radon points", International Journal of Computational Geometry & Applications 6 (3): 357–377, September 1996, http://www.almaden.ibm.com/u/kclarkson/center/p.pdf .
• Edelsbrunner, Herbert (1987), Algorithms in Combinatorial Geometry, Berlin: Springer-Verlag, ISBN 0-387-13722-X, https://archive.org/details/algorithmsincomb00edel .
• Jadhav, S.; Mukhopadhyay, A. (1994), "Computing a centerpoint of a finite planar set of points in linear time", Discrete and Computational Geometry 12 (1): 291–312, doi:10.1007/BF02574382 .
• Har-Peled, S.; Jones, M. (2020-12-31), "Journey to the Center of the Point Set", ACM Transactions on Algorithms 17 (1): 9:1–9:21, doi:10.1145/3431285, ISSN 1549-6325, https://doi.org/10.1145/3431285 .

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