Clustering of ranking data aims at the identification of groups of subjects with a homogenous, common, preference behavior. Ranking data occurs when a number of subjects are asked to rank a list of objects according to their personal preference order. The input in cluster analysis is a distance matrix, whose elements measure the distances between rankings of two subjects. The choice of the distance dramatically affects the final result and therefore the computation of an appropriate distance matrix is an issue. Several distance measures have been proposed for ranking data. The most important are the Kendalls t, Spearmans r and Cayley distances. When the aim is to emphasize top ranks, weighted distances for ranking data should be used. We pr...
We propose a new family of distance measures on rankings, derived through an axiomatic approach, tha...
Ranking data has applications in different fields of studies, like marketing, psychology and politic...
This work introduces a supervised tree-based method dealing with preference rankings as response var...
Clustering of ranking data aims at the identification of groups of subjects with a homogenous, com-m...
A new distance measure is defined for ranking data by using copula functions. This distance evaluate...
We define a new distance measure for ranking data by using a mixture of copula functions. This dista...
We define a new distance measure for ranking data using a mixture of copula functions. Our distance ...
We propose a new measure to evaluate the dissimilarity between rankings in hierarchical cluster anal...
We de\ufb01ne a new distance measure for ranking data by using a mixture of copula functions. This d...
We propose a new measure to evaluate the distance between subjects expressing their preferences by r...
We propose a new dissimilarity measure for ranking data by using a mixture of copula functions. This...
Objects can be clustered in many different ways. As a matter of fact there are several cluster analy...
Preference data represent a particular type of ranking data where a group of people gives their pref...
The clustering of time series has attracted growing research interest in recent years. The most popu...
Typically, ranking data consist of a set of individuals, or judges, who have ordered a set of items—...
We propose a new family of distance measures on rankings, derived through an axiomatic approach, tha...
Ranking data has applications in different fields of studies, like marketing, psychology and politic...
This work introduces a supervised tree-based method dealing with preference rankings as response var...
Clustering of ranking data aims at the identification of groups of subjects with a homogenous, com-m...
A new distance measure is defined for ranking data by using copula functions. This distance evaluate...
We define a new distance measure for ranking data by using a mixture of copula functions. This dista...
We define a new distance measure for ranking data using a mixture of copula functions. Our distance ...
We propose a new measure to evaluate the dissimilarity between rankings in hierarchical cluster anal...
We de\ufb01ne a new distance measure for ranking data by using a mixture of copula functions. This d...
We propose a new measure to evaluate the distance between subjects expressing their preferences by r...
We propose a new dissimilarity measure for ranking data by using a mixture of copula functions. This...
Objects can be clustered in many different ways. As a matter of fact there are several cluster analy...
Preference data represent a particular type of ranking data where a group of people gives their pref...
The clustering of time series has attracted growing research interest in recent years. The most popu...
Typically, ranking data consist of a set of individuals, or judges, who have ordered a set of items—...
We propose a new family of distance measures on rankings, derived through an axiomatic approach, tha...
Ranking data has applications in different fields of studies, like marketing, psychology and politic...
This work introduces a supervised tree-based method dealing with preference rankings as response var...