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Efficiently updating and tracking the dominant kernel principal components

✍ Scribed by L. Hoegaerts; L. De Lathauwer; I. Goethals; J.A.K. Suykens; J. Vandewalle; B. De Moor

Publisher: Elsevier Science
Year: 2007
Tongue: English
Weight: 731 KB
Volume: 20
Category: Article
ISSN: 0893-6080
DOI: 10.1016/j.neunet.2006.09.012

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✦ Synopsis

The dominant set of eigenvectors of the symmetrical kernel Gram matrix is used in many important kernel methods (like e.g. kernel Principal Component Analysis, feature approximation, denoising, compression, prediction) in the machine learning area. Yet in the case of dynamic and/or large-scale data, the batch calculation nature and computational demands of the eigenvector decomposition limit these methods in numerous applications. In this paper we present an efficient incremental approach for fast calculation of the dominant kernel eigenbasis, which allows us to track the kernel eigenspace dynamically. Experiments show that our updating scheme delivers a numerically stable and accurate approximation for eigenvalues and eigenvectors at every iteration in comparison to the batch algorithm.

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✍ K. R. Briffa; P. D. Jones; P. M. Kelly 📂 Article 📅 1990 🏛 John Wiley and Sons 🌐 English ⚖ 1008 KB

## Abstract Principal component analysis is applied to seasonal weather‐type frequencies from the Lamb Catalogue of Daily Weather Types for the British Isles. Four combinations of the major weather types are identified, which represent around 70 per cent of the variance of the data set. Long‐term t