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Pregled bibliografske jedinice broj: 639307

Nonlinear Mixture-wise Expansion Approach to Underdetermined Blind Separation of Nonnegative Dependent Sources


Kopriva, Ivica; Jerić, Ivanka; Brkljačić, Lidija
Nonlinear Mixture-wise Expansion Approach to Underdetermined Blind Separation of Nonnegative Dependent Sources // Journal of chemometrics, 27 (2013), 7/8; 189-197 doi:10.1002/cem.2512 (međunarodna recenzija, članak, znanstveni)


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Naslov
Nonlinear Mixture-wise Expansion Approach to Underdetermined Blind Separation of Nonnegative Dependent Sources

Autori
Kopriva, Ivica ; Jerić, Ivanka ; Brkljačić, Lidija

Izvornik
Journal of chemometrics (0886-9383) 27 (2013), 7/8; 189-197

Vrsta, podvrsta i kategorija rada
Radovi u časopisima, članak, znanstveni

Ključne riječi
underdetermined blind source separation ; dependent sources ; reproducible kernel Hilbert spaces ; empirical kernel maps ; nonnegative matrix factorization

Sažetak
Underdetermined blind separation of nonnegative dependent sources consists in decomposing set of observed mixed signals into greater number of original nonnegative and dependent component (source) signals. That is an important problem for which very few algorithms exist. It is also practically relevant for contemporary metabolic profiling of biological samples, such as biomarker identification studies, where sources (a.k.a. pure components or analytes) are aimed to be extracted from mass spectra of complex multicomponent mixtures. This paper presents method for underdetermined blind separation of nonnegative dependent sources. The method performs nonlinear mixture-wise mapping of observed data in high-dimensional reproducible kernel Hilbert space (RKHS) of functions and sparseness constrained nonnegative matrix factorization (NMF) therein. Thus, original problem is converted into new one with increased number of mixtures, increased number of dependent sources and higher-order (error) terms generated by nonlinear mapping. Provided that amplitudes of original components are sparsely distributed, that is the case for mass spectra of analytes, sparseness constrained NMF in RKHS yields, with significant probability, improved accuracy relative to the case when the same NMF algorithm is performed on original problem. The method is exemplified on numerical and experimental examples related respectively to extraction of ten dependent components from five mixtures and to extraction of ten dependent analytes from mass spectra of two to five mixtures. Thereby, analytes mimic complexity of components expected to be found in biological samples.

Izvorni jezik
Engleski

Znanstvena područja
Matematika, Kemija, Računarstvo



POVEZANOST RADA


Projekti:
HRZZ-09.01/232 - Analiza nelinearnih komponenata s primjenama u kemometriji i patologiji (Kopriva, Ivica, HRZZ ) ( CroRIS)

Ustanove:
Institut "Ruđer Bošković", Zagreb

Profili:

Avatar Url Ivica Kopriva (autor)

Avatar Url Ivanka Jerić (autor)

Citiraj ovu publikaciju:

Kopriva, Ivica; Jerić, Ivanka; Brkljačić, Lidija
Nonlinear Mixture-wise Expansion Approach to Underdetermined Blind Separation of Nonnegative Dependent Sources // Journal of chemometrics, 27 (2013), 7/8; 189-197 doi:10.1002/cem.2512 (međunarodna recenzija, članak, znanstveni)
Kopriva, I., Jerić, I. & Brkljačić, L. (2013) Nonlinear Mixture-wise Expansion Approach to Underdetermined Blind Separation of Nonnegative Dependent Sources. Journal of chemometrics, 27 (7/8), 189-197 doi:10.1002/cem.2512.
@article{article, author = {Kopriva, Ivica and Jeri\'{c}, Ivanka and Brklja\v{c}i\'{c}, Lidija}, year = {2013}, pages = {189-197}, DOI = {10.1002/cem.2512}, keywords = {underdetermined blind source separation, dependent sources, reproducible kernel Hilbert spaces, empirical kernel maps, nonnegative matrix factorization}, journal = {Journal of chemometrics}, doi = {10.1002/cem.2512}, volume = {27}, number = {7/8}, issn = {0886-9383}, title = {Nonlinear Mixture-wise Expansion Approach to Underdetermined Blind Separation of Nonnegative Dependent Sources}, keyword = {underdetermined blind source separation, dependent sources, reproducible kernel Hilbert spaces, empirical kernel maps, nonnegative matrix factorization} }
@article{article, author = {Kopriva, Ivica and Jeri\'{c}, Ivanka and Brklja\v{c}i\'{c}, Lidija}, year = {2013}, pages = {189-197}, DOI = {10.1002/cem.2512}, keywords = {underdetermined blind source separation, dependent sources, reproducible kernel Hilbert spaces, empirical kernel maps, nonnegative matrix factorization}, journal = {Journal of chemometrics}, doi = {10.1002/cem.2512}, volume = {27}, number = {7/8}, issn = {0886-9383}, title = {Nonlinear Mixture-wise Expansion Approach to Underdetermined Blind Separation of Nonnegative Dependent Sources}, keyword = {underdetermined blind source separation, dependent sources, reproducible kernel Hilbert spaces, empirical kernel maps, nonnegative matrix factorization} }

Časopis indeksira:


  • Current Contents Connect (CCC)
  • Web of Science Core Collection (WoSCC)
    • Science Citation Index Expanded (SCI-EXP)
    • SCI-EXP, SSCI i/ili A&HCI
  • Scopus


Citati:





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