Treffer: Consistency, breakdown robustness, and algorithms for robust improper maximum likelihood clustering
Title:
Consistency, breakdown robustness, and algorithms for robust improper maximum likelihood clustering
Authors:
Contributors:
Coretto, Pietro, Hennig, Christian
Publication Year:
2017
Collection:
IRIS Università degli Studi di Bologna (CRIS - Current Research Information System)
Subject Terms:
Document Type:
Fachzeitschrift
article in journal/newspaper
File Description:
ELETTRONICO
Language:
English
Relation:
info:eu-repo/semantics/altIdentifier/wos/WOS:000424548800001; volume:18; firstpage:1; lastpage:39; numberofpages:39; journal:JOURNAL OF MACHINE LEARNING RESEARCH; http://hdl.handle.net/11585/677283
Availability:
Rights:
info:eu-repo/semantics/openAccess
Accession Number:
edsbas.16FDA4C4
Database:
BASE
Weitere Informationen
The robust improper maximum likelihood estimator (RIMLE) is a new method for robust multivariate clustering finding approximately Gaussian clusters. It maximizes a pseudo-likelihood defined by adding a component with improper constant density for accommodating outliers to a Gaussian mixture. A special case of the RIMLE is MLE for multi-variate finite Gaussian mixture models. In this paper we treat existence, consistency, and breakdown theory for the RIMLE comprehensively. RIMLE's existence is proved under non-smooth covariance matrix constraints. It is shown that these can be implemented via a computationally feasible Expectation-Conditional Maximization algorithm.