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CLC number: TP751.1
On-line Access: 2024-08-27
Received: 2023-10-17
Revision Accepted: 2024-05-08
Crosschecked: 2016-04-25
Cited: 3
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Non-negative matrix factorization based unmixing for principal component transformed hyperspectral data
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Xiu-rui Geng, Lu-yan Ji, Kang Sun. Non-negative matrix factorization based unmixing for principal component transformed hyperspectral data[J]. Frontiers of Information Technology & Electronic Engineering, 2016, 17(5): 403-412.
@article{title="Non-negative matrix factorization based unmixing for principal component transformed hyperspectral data",
author="Xiu-rui Geng, Lu-yan Ji, Kang Sun",
journal="Frontiers of Information Technology & Electronic Engineering",
volume="17",
number="5",
pages="403-412",
year="2016",
publisher="Zhejiang University Press & Springer",
doi="10.1631/FITEE.1600028"
}
%0 Journal Article
%T Non-negative matrix factorization based unmixing for principal component transformed hyperspectral data
%A Xiu-rui Geng
%A Lu-yan Ji
%A Kang Sun
%J Frontiers of Information Technology & Electronic Engineering
%V 17
%N 5
%P 403-412
%@ 2095-9184
%D 2016
%I Zhejiang University Press & Springer
%DOI 10.1631/FITEE.1600028
TY - JOUR
T1 - Non-negative matrix factorization based unmixing for principal component transformed hyperspectral data
A1 - Xiu-rui Geng
A1 - Lu-yan Ji
A1 - Kang Sun
J0 - Frontiers of Information Technology & Electronic Engineering
VL - 17
IS - 5
SP - 403
EP - 412
%@ 2095-9184
Y1 - 2016
PB - Zhejiang University Press & Springer
ER -
DOI - 10.1631/FITEE.1600028
Abstract: non-negative matrix factorization (NMF) has been widely used in mixture analysis for hyperspectral remote sensing. When used for spectral unmixing analysis, however, it has two main shortcomings: (1) since the dimensionality of hyperspectral data is usually very large, NMF tends to suffer from large computational complexity for the popular multiplicative iteration rule; (2) NMF is sensitive to noise (outliers), and thus the corrupted data will make the results of NMF meaningless. Although principal component analysis (PCA) can be used to mitigate these two problems, the transformed data will contain negative numbers, hindering the direct use of the multiplicative iteration rule of NMF. In this paper, we analyze the impact of PCA on NMF, and find that multiplicative NMF can also be applicable to data after principal component transformation. Based on this conclusion, we present a method to perform NMF in the principal component space, named ‘principal component NMF’ (PCNMF). Experimental results show that PCNMF is both accurate and time-saving.
This paper proposed to combine PCA and OP process to realize dimensionality reduction for the multiplicative updating rule of NMF. Benefiting from PCA, the new method can obtain better unmixing performance comparing to NMF regarding to both computational complexity and accuracy. The idea is new and the paper is well organized.
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