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IDEAL
2010
Springer

Approximating the Covariance Matrix of GMMs with Low-Rank Perturbations

13 years 9 months ago
Approximating the Covariance Matrix of GMMs with Low-Rank Perturbations
: Covariance matrices capture correlations that are invaluable in modeling real-life datasets. Using all d2 elements of the covariance (in d dimensions) is costly and could result in over-fitting; and the simple diagonal approximation can be over-restrictive. In this work, we present a new model, the Low-Rank Gaussian Mixture Model (LRGMM), for modeling data which can be extended to identifying partitions or overlapping clusters. The curse of dimensionality that arises in calculating the covariance matrices of the GMM is countered by using low-rank perturbed diagonal matrices. The efficiency is comparable to the diagonal approximation, yet one can capture correlations among the dimensions. Our experiments reveal the LRGMM to be an efficient and highly applicable tool for working with large high-dimensional datasets.
Malik Magdon-Ismail, Jonathan T. Purnell
Added 04 Mar 2011
Updated 04 Mar 2011
Type Journal
Year 2010
Where IDEAL
Authors Malik Magdon-Ismail, Jonathan T. Purnell
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