Funtional vector quantization by neural maps

We propose the utilization of Sobolev-norms in unsupervised and supervised vector quantization for clustering and classification of functional data. Sobolev-norms differ from the usual Minkowski-norm by the incorporation of derivatives such that the functional shape is taken into account. This leads...

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Bibliographic Details
Published in	2009 First Workshop on Hyperspectral Image and Signal Processing: Evolution in Remote Sensing pp. 1 - 4
Main Authors	Villmann, T., Schleif, F.-M.
Format	Conference Proceeding
Language	English
Published	IEEE 01.08.2009
Subjects	classification Clustering algorithms Data analysis Machine learning Mathematics Prototypes Remote sensing Shape Sobolev-norms Supervised learning Training data Vector quantization
Online Access	Get full text
ISBN	9781424446865 1424446864
ISSN	2158-6268
DOI	10.1109/WHISPERS.2009.5289064

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Summary:	We propose the utilization of Sobolev-norms in unsupervised and supervised vector quantization for clustering and classification of functional data. Sobolev-norms differ from the usual Minkowski-norm by the incorporation of derivatives such that the functional shape is taken into account. This leads to a more appropriate modelling of functional data. As we figure out, the Sobolev-norm can easily plugged into prototype based adaptive vector quantization algorithms to process functional data adequately. We show for an example application in remote sensing data analysis that this methodology may lead to improved performance of the algorithms.
ISBN:	9781424446865 1424446864
ISSN:	2158-6268
DOI:	10.1109/WHISPERS.2009.5289064