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Article overview
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Local Component Analysis | Nicolas Le Roux
; Francis Bach
; | Date: |
1 Sep 2011 | Abstract: | Kernel density estimation, a.k.a. Parzen windows, is a popular density
estimation method, which can be used for outlier detection or clustering. With
multivariate data, its performance is heavily reliant on the metric used within
the kernel. Most earlier work has focused on learning only the bandwidth of the
kernel (i.e., a scalar multiplicative factor). In this paper, we propose to
learn a full Euclidean metric through an expectation-minimization (EM)
procedure, which can be seen as an unsupervised counterpart to neighbourhood
component analysis (NCA). In order to avoid overfitting with a fully
nonparametric density estimator in high dimensions, we also consider a
semi-parametric Gaussian-Parzen density model, where some of the variables are
modelled through a jointly Gaussian density, while others are modelled through
Parzen windows. For these two models, EM leads to simple closed-form updates
based on matrix inversions and eigenvalue decompositions. We show empirically
that our method leads to density estimators with higher test-likelihoods than
natural competing methods, and that the metrics may be used within most
unsupervised learning techniques that rely on such metrics, such as spectral
clustering or manifold learning methods. Finally, we present a stochastic
approximation scheme which allows for the use of this method in a large-scale
setting. | Source: | arXiv, 1109.0093 | Services: | Forum | Review | PDF | Favorites |
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