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Inicio  /  Algorithms  /  Vol: 13 Par: 12 (2020)  /  Artículo
ARTÍCULO
TITULO

k-Means+++: Outliers-Resistant Clustering

Adiel Statman    
Liat Rozenberg and Dan Feldman    

Resumen

The k-means problem is to compute a set of k centers (points) that minimizes the sum of squared distances to a given set of n points in a metric space. Arguably, the most common algorithm to solve it is k-means++ which is easy to implement and provides a provably small approximation error in time that is linear in n. We generalize k-means++ to support outliers in two sense (simultaneously): (i) nonmetric spaces, e.g., M-estimators, where the distance dist(??,??) dist ( p , x ) between a point p and a center x is replaced by min{dist(??,??),??} min dist ( p , x ) , c for an appropriate constant c that may depend on the scale of the input. (ii) k-means clustering with ??=1 m = 1 outliers, i.e., where the m farthest points from any given k centers are excluded from the total sum of distances. This is by using a simple reduction to the (??+??) ( k + m ) -means clustering (with no outliers).

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