<div class="csl-bib-body">
<div class="csl-entry">El-Cheschin, C. (2017). <i>Non-negative matrix factorization</i> [Diploma Thesis, Technische Universität Wien]. reposiTUm. https://doi.org/10.34726/hss.2017.51380</div>
</div>
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dc.identifier.uri
https://doi.org/10.34726/hss.2017.51380
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dc.identifier.uri
http://hdl.handle.net/20.500.12708/3047
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dc.description.abstract
Non-negative matrix factorization - NMF is a Linear Dimensionality Reduction method, which approximates a high dimensional non-negative data matrix by a multiplica- tion of two low-ranked matrices that preserves the non-negativity of the data. This property has proven to be beneficial as it allows for the approximated data to be interpreted in the same way as the original data. In addition, NMF leads to a part- based representation of the data, which supports easy identification of the essential parts/features. The thesis starts with a short introduction of NMF, which includes a motivation behind the method, a detailed comparison to the well-known Principal Component Analysis and the possible generalizations of the ”standard NMF” problem. This is followed by a chapter presenting an overview of the wide range of NMF algorithms, which are separated into algorithms based on standard nonlinear optimization schemes and so called separable NMF. All algorithms of the first group are based on the two block gradient descent scheme. In contrast, the separable NMF is restricted to a subclass of matrices characterized by a practical geometrical interpretation which is exploited in many separable NMF algorithms. The last theoretical chapter focuses on the description of the key topics that should be considered when applying NMF such as initialization methods, rank estimation and quality measures to compare the performance of the algorithms. The thesis concludes with the analysis of the NMF methods for a spectrometric dataset consisting of TOF-SIMS measurements taken from meteorites. The ability of NMF to separate spectra into two dissimilar spectra with one considered as the background and one as meteorite specific has been analyzed. The obtained results are promising and give reason to believe that NMF is an adequate method for such tasks. In addition, the robustness to noise of NMF methods in the context of spectral data has been tested and finally the task of defining an appropriate factorization rank has been discussed.
en
dc.language
English
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dc.language.iso
en
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dc.rights.uri
http://rightsstatements.org/vocab/InC/1.0/
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dc.subject
Independent component analysis
en
dc.subject
Principal component analysis
en
dc.title
Non-negative matrix factorization
en
dc.type
Thesis
en
dc.type
Hochschulschrift
de
dc.rights.license
In Copyright
en
dc.rights.license
Urheberrechtsschutz
de
dc.identifier.doi
10.34726/hss.2017.51380
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dc.contributor.affiliation
TU Wien, Österreich
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dc.rights.holder
Carim El-Cheschin
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dc.publisher.place
Wien
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tuw.version
vor
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tuw.thesisinformation
Technische Universität Wien
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tuw.publication.orgunit
E105 - Institut für Stochastik und Wirtschaftsmathematik
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dc.type.qualificationlevel
Diploma
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dc.identifier.libraryid
AC14536546
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dc.description.numberOfPages
100
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dc.identifier.urn
urn:nbn:at:at-ubtuw:1-107165
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dc.thesistype
Diplomarbeit
de
dc.thesistype
Diploma Thesis
en
dc.rights.identifier
In Copyright
en
dc.rights.identifier
Urheberrechtsschutz
de
tuw.advisor.staffStatus
staff
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tuw.advisor.orcid
0000-0002-8014-4682
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item.fulltext
with Fulltext
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item.grantfulltext
open
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item.cerifentitytype
Publications
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item.cerifentitytype
Publications
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item.languageiso639-1
en
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item.openairecristype
http://purl.org/coar/resource_type/c_18cf
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item.openairecristype
http://purl.org/coar/resource_type/c_18cf
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item.openairetype
Thesis
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item.openairetype
Hochschulschrift
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item.openaccessfulltext
Open Access
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crisitem.author.dept
E107 - Institut für Statistik und Wahrscheinlichkeitstheorie