Nearest neighbor graph

The nearest neighbor graph (NNG) for a set of n objects P in a metric space (e.g., for a set of points in the plane with Euclidean distance) is a directed graph with P being its vertex set and with a directed edge from p to q whenever q is a nearest neighbor of p (i.e., the distance from p to q is no larger than from p to any other object from P).[1]

A nearest neighbor graph of 100 points in the Euclidean plane.

In many discussions the directions of the edges are ignored and the NNG is defined as an ordinary (undirected) graph. However, the nearest neighbor relation is not a symmetric one, i.e., p from the definition is not necessarily a nearest neighbor for q.

In some discussions, in order to make the nearest neighbor for each object unique, the set P is indexed and in the case of a tie the object with, e.g., the largest index is taken for the nearest neighbor.[2]

The k-nearest neighbor graph (k-NNG) is a graph in which two vertices p and q are connected by an edge, if the distance between p and q is among the k-th smallest distances from p to other objects from P. The NNG is a special case of the k-NNG, namely it is the 1-NNG. k-NNGs obey a separator theorem: they can be partitioned into two subgraphs of at most n(d + 1)/(d + 2) vertices each by the removal of O(k1/dn1  1/d) points.[3]

Another special case is the (n  1)-NNG. This graph is called the farthest neighbor graph (FNG).

In theoretical discussions of algorithms a kind of general position is often assumed, namely, the nearest (k-nearest) neighbor is unique for each object. In implementations of the algorithms it is necessary to bear in mind that this is not always the case.

NNGs for points in the plane as well as in multidimensional spaces find applications, e.g., in data compression, motion planning, and facilities location. In statistical analysis, the nearest-neighbor chain algorithm based on following paths in this graph can be used to find hierarchical clusterings quickly. Nearest neighbor graphs are also a subject of computational geometry.

NNGs for sets of points

One-dimensional case

For a set of points on a line, the nearest neighbor of a point is its left or right (or both) neighbor, if they are sorted along the line. Therefore, the NNG is a path or a forest of several paths and may be constructed in O(n log n) time by sorting. This estimate is asymptotically optimal for certain models of computation, because the constructed NNG gives the answer to the element uniqueness problem : it is sufficient to check whether the NNG has a zero-length edge.[4]

Higher dimensions

Unless stated otherwise, it is assumed that the NNGs are digraphs with uniquely defined nearest neighbors as described in the introduction.

  1. Along any directed path in an NNG the edge lengths are non-increasing.[2]
  2. Only cycles of length 2 are possible in an NNG and each weakly connected component of an NNG with at least 2 vertices has exactly one 2-cycle.[2]
  3. For the points in the plane the NNG is a planar graph with vertex degrees at most 6. If points are in general position, the degree is at most 5.[2]
  4. The NNG (treated as an undirected graph with multiple nearest neighbors allowed) of a set of points in the plane or any higher dimension is a subgraph of the Delaunay triangulation, the Gabriel graph, and the Semi-Yao graph.[5] If the points are in general position or if the single nearest neighbor condition is imposed, the NNG is a forest, a subgraph of the Euclidean minimum spanning tree.

References

  1. Franco P. Preparata and Michael Ian Shamos (1985). Computational Geometry - An Introduction. Springer-Verlag. ISBN 0-387-96131-3. 1st edition: ; 2nd printing, corrected and expanded, 1988: ; Russian translation, 1989.
  2. Eppstein, D.; Paterson, M. S.; Yao, Frances (1997). "On nearest-neighbor graphs". Discrete and Computational Geometry. 17 (3): 263–282. doi:10.1007/PL00009293.
  3. Miller, Gary L.; Teng, Shang-Hua; Thurston, William; Vavasis, Stephen A. (1997). "Separators for sphere-packings and nearest neighbor graphs". J. ACM. 44 (1): 1–29. doi:10.1145/256292.256294.
  4. Aggarwal, Alok; Kipnis, Shlomo (August 1988). "Lecture #10, March 10, 1988: Closest pair". In Aggarwal, Alok; Wein, Joel (eds.). Computational Geometry: Lecture Notes for 18.409, Spring 1988. Massachusetts Institute of Technology Laboratory for Computer Science. Observation 1, p. 2.
  5. Rahmati, Z.; King, V.; Whitesides, S. (2013). Kinetic data structures for all nearest neighbors and closest pair in the plane. Proceedings of the 29th ACM Symposium on Computational Geometry. pp. 137–144. doi:10.1145/2462356.2462378.
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