Dissimilarity functions for rank-invariant hierarchical clustering of continuous variables

Sebastian Fuchs; Francesca Marta Lilja Di Lascio; Fabrizio Durante

doi:10.1016/j.csda.2021.107201

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Dissimilarity functions for rank-invariant hierarchical clustering of continuous variables

Journal article

Open access

Peer reviewed

Dissimilarity functions for rank-invariant hierarchical clustering of continuous variables

Sebastian Fuchs, Francesca Marta Lilja Di Lascio and Fabrizio Durante

Computational Statistics and Data Analysis, Vol.159, 107201

159

2021

DOI: https://doi.org/10.1016/j.csda.2021.107201

Handle:

https://hdl.handle.net/10863/17465

Abstract

Comonotonicity

Copula

Cluster analysis

Dissimilarity

Stochastic dependence

A theoretical framework is presented for a (copula-based) notion of dissimilarity between continuous random vectors and its main properties are studied. The proposed dissimilarity assigns the smallest value to a pair of random vectors that are comonotonic. Various properties of this dissimilarity are studied, with special attention to those that are prone to the hierarchical agglomerative methods, such as reducibility. Some insights are provided for the use of such a measure in clustering algorithms and a simulation study is presented. Real case studies illustrate the main features of the whole methodology.

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Details

Title: Dissimilarity functions for rank-invariant hierarchical clustering of continuous variables
Creators: Sebastian Fuchs
Francesca Marta Lilja Di Lascio
Fabrizio Durante
Publication Details: Computational Statistics and Data Analysis, Vol.159, 107201
ISSN: 0167-9473
Series / Volume: 159
Publisher: Elsevier
Number of pages: 26
Identifiers: (UNIBZ)38752387
991006010649401241
Web of Science ID: 000639095400005
Scopus ID: 2-s2.0-85102056002
Academic Unit: Faculty of Economics and Management
Language: English
Resource Type: Journal article
Author Names String: Fuchs S, Di Lascio FML, Durante F

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