In this article, we present a strategy for producing low-dimensional projections that maximally separate the classes in Gaussian Mixture Model classification. The most revealing linear manifolds are those along which the classes are maximally separable. Here we consider a particular probability product kernel as a measure of similarity or affinity between the class-conditional distributions. It takes an appealing closed analytical form in the case of Gaussian mixture components. The performance of the proposed strategy has been evaluated on real data.
D. G. Calò, C. Viroli (2008). Finding Relevant Linear Manifolds in Classification by Gaussian Mixtures. COMMUNICATIONS IN STATISTICS. THEORY AND METHODS, 37, 3040-3053 [10.1080/03610920802065073].
Finding Relevant Linear Manifolds in Classification by Gaussian Mixtures
CALO', DANIELA GIOVANNA;VIROLI, CINZIA
2008
Abstract
In this article, we present a strategy for producing low-dimensional projections that maximally separate the classes in Gaussian Mixture Model classification. The most revealing linear manifolds are those along which the classes are maximally separable. Here we consider a particular probability product kernel as a measure of similarity or affinity between the class-conditional distributions. It takes an appealing closed analytical form in the case of Gaussian mixture components. The performance of the proposed strategy has been evaluated on real data.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
