This paper presents a review about the usage of eigenvalues restrictions for constrained parameter estimation in mixtures of elliptical distributions according to the likelihood approach. The restrictions serve a twofold purpose: to avoid convergence to degenerate solutions and to reduce the onset of non interesting (spurious) local maximizers, related to complex likelihood surfaces. The paper shows how the constraints may play a key role in the theory of Euclidean data clustering. The aim here is to provide a reasoned survey of the constraints and their applications, considering the contributions of many authors and spanning the literature of the last 30 years.
Garcìa-escudero, L., Gordaliza, A., Greselin, F., Ingrassia, S., Mayo-iscar, A. (2018). Eigenvalues and constraints in mixture modeling: Geometric and computational issues. ADVANCES IN DATA ANALYSIS AND CLASSIFICATION, 12(2), 203-233 [10.1007/s11634-017-0293-y].
Eigenvalues and constraints in mixture modeling: Geometric and computational issues
Greselin, F;
2018
Abstract
This paper presents a review about the usage of eigenvalues restrictions for constrained parameter estimation in mixtures of elliptical distributions according to the likelihood approach. The restrictions serve a twofold purpose: to avoid convergence to degenerate solutions and to reduce the onset of non interesting (spurious) local maximizers, related to complex likelihood surfaces. The paper shows how the constraints may play a key role in the theory of Euclidean data clustering. The aim here is to provide a reasoned survey of the constraints and their applications, considering the contributions of many authors and spanning the literature of the last 30 years.
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