Minkowski Weighted K-Means is a variant of K-Means set in the Minkowski space, automatically computing weights for features at each cluster. As a variant of K-Means, its accuracy heavily depends on the initial centroids fed to it. In this paper we discuss our experiments comparing six initializations, random and five other initializations in the Minkowski space, in terms of their accuracy, processing time, and the recovery of the Minkowski exponent p. We have found that the Ward method in the Minkowski space tends to outperform other initializations, with the exception of low-dimensional Gaussian Models with noise features. In these, a modified version of intelligent K-Means excels
This document is the Accepted Manuscript version of the following article: Renato Cordeiro de Amorin...
We consider the Weighted K-Means algorithm with distributed centroids aimed at clustering data sets ...
K-Means (KM) is considered one of the major algorithms widely used in clustering. However, it still ...
Minkowski Weighted K-Means is a variant of K-Means set in the Minkowski space, automatically computi...
Recently, a three-stage version of K-Means has been introduced, at which not only clusters and their...
This paper represents another step in overcoming a drawback of K-Means, its lack of defense against ...
This paper represents another step in overcoming a drawback of K-Means, its lack of defense against ...
The Minkowski weighted K-means (MWK-means) is a recently developed clustering algorithm capable of c...
In this paper we introduce the Constrained Minkowski Weighted K-Means. This algorithm calculates clu...
k-means is a simple and flexible clustering algorithm that has remained in common use for 50+ years....
In this paper we introduce the Minkowski weighted partition around medoids algorithm (MW-PAM). This ...
The weighted variant of k-Means (Wk-Means), which assigns values to features based on their relevanc...
Abstract — The famous K-means clustering algorithm is sensitive to the selection of the initial cent...
In this paper we make two novel contributions to hierarchical clustering. First, we introduce an ano...
In this paper we make two novel contributions to hierarchical clustering. First, we introduce an ano...
This document is the Accepted Manuscript version of the following article: Renato Cordeiro de Amorin...
We consider the Weighted K-Means algorithm with distributed centroids aimed at clustering data sets ...
K-Means (KM) is considered one of the major algorithms widely used in clustering. However, it still ...
Minkowski Weighted K-Means is a variant of K-Means set in the Minkowski space, automatically computi...
Recently, a three-stage version of K-Means has been introduced, at which not only clusters and their...
This paper represents another step in overcoming a drawback of K-Means, its lack of defense against ...
This paper represents another step in overcoming a drawback of K-Means, its lack of defense against ...
The Minkowski weighted K-means (MWK-means) is a recently developed clustering algorithm capable of c...
In this paper we introduce the Constrained Minkowski Weighted K-Means. This algorithm calculates clu...
k-means is a simple and flexible clustering algorithm that has remained in common use for 50+ years....
In this paper we introduce the Minkowski weighted partition around medoids algorithm (MW-PAM). This ...
The weighted variant of k-Means (Wk-Means), which assigns values to features based on their relevanc...
Abstract — The famous K-means clustering algorithm is sensitive to the selection of the initial cent...
In this paper we make two novel contributions to hierarchical clustering. First, we introduce an ano...
In this paper we make two novel contributions to hierarchical clustering. First, we introduce an ano...
This document is the Accepted Manuscript version of the following article: Renato Cordeiro de Amorin...
We consider the Weighted K-Means algorithm with distributed centroids aimed at clustering data sets ...
K-Means (KM) is considered one of the major algorithms widely used in clustering. However, it still ...