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R. Connor, L. Vadicamo, F. A. Cardillo, F. Rabitti: “Supermetric Search with the Four-Point Proper-ty”, Proceedings of the 9th International Conference on Similiarty Search and Applications (SISAP 2016). Springer International Publishing. Oct 2016

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Metric indexing research is concerned with the efficient evaluation of queries in metric spaces. In general, a large space of objects is arranged in such a way that, when a further object is presented as a query, those objects most similar to the query can be efficiently found. Most such mechanisms rely upon the triangle inequality property of the metric governing the space. The triangle inequality property is equivalent to a finite embedding property, which states that any three points of the space can be isometrically embedded in two-dimensional Euclidean space. In this paper, we examine a class of semimetric space which is fi nitely 4-embeddable in three-dimensional Euclidean space. In mathematics this property has been extensively studied and is generally known as the four-point property. All spaces with the four-point property are metric spaces, but they also have some stronger geometric guarantees. We coin the term supermetric space as, in terms of metric search, theyare signi ficantly more tractable. We show some stronger geometric guarantees deriving from the four-point property which can be used in indexing to great eff ect, and show results for two of the SISAP benchmark searches that are substantially better than any previously published.

 

Filehttp://link.springer.com/chapter/10.1007/978-3-319-46759-7_4