The goal of statistical methods for dimensionality reduction is to detect and discover low dimensional structures in high dimensional data. Here, we discuss a recently proposed method, known as Maximum Entropy Unfolding (MEU), for learning faithful low dimensional representations of high dimensional data. This method represents a new perspective on spectral dimensionality reduction and, joined with the theory of Gaussian Markov random fields, provides a unifying probabilistic approach to spectral dimensionality reduction techniques. Parameter estimation as well as approaches to learning the structure of the GMRF are discussed.
Graphical methods for dimensionality reduction on manifolds
ROMAGNOLI, Luca
2013-01-01
Abstract
The goal of statistical methods for dimensionality reduction is to detect and discover low dimensional structures in high dimensional data. Here, we discuss a recently proposed method, known as Maximum Entropy Unfolding (MEU), for learning faithful low dimensional representations of high dimensional data. This method represents a new perspective on spectral dimensionality reduction and, joined with the theory of Gaussian Markov random fields, provides a unifying probabilistic approach to spectral dimensionality reduction techniques. Parameter estimation as well as approaches to learning the structure of the GMRF are discussed.File in questo prodotto:
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