Convex and Semi-Nonnegative Matrix Factorizations

Ding, Chris; Li, Tao; Jordan, Michael I.

doi:10.1109/tpami.2008.277

Cited by 1,099 publications

(827 citation statements)

References 25 publications

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“…The results are highly competitive with other methods. For Euclidean distance, although our algorithm's sparsity is only less than cNMF [18] (Figure 2), it has lower information loss and higher performance in classification. In addition, especially for KL-divergence, our approach retains the best sparse solutions (Figure 3), while it still has the best result for the other measures.…”

Section: A Interpretationmentioning

confidence: 95%

“…More particularly, our algorithm for Euclidean distance is compared to NMF [3], spNMF [17], oNMF [8], and cNMF [18], while the other one with KL-divergence is compared to kl-NMF [3], local non-negative matrix factorization (locNMF) [5], convolutional NMF(conNMF) [19], and Nonsmooth Nonnegative Matrix Factorization (nsNMF) [7]. The implemented codes are at http://www.ee.columbia.edu/ grindlay/code.html.…”

Section: Methodsmentioning

confidence: 99%

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Simplicial nonnegative matrix factorization

Nguyen

Than

2013

The 2013 RIVF International Conference on Computing &Amp; Communication Technologies - Research, Innovation, and Vision for Fut

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Abstract-Nonnegative matrix factorization (NMF) plays a crucial role in machine learning and data mining, especially for dimension reduction and component analysis. It is employed widely in different fields such as information retrieval, image processing, etc. After a decade of fast development, severe limitations still remained in NMFs methods including high complexity in instance inference, hard to control sparsity or to interpret the role of latent components. To deal with these limitations, this paper proposes a new formulation by adding simplicial constraints for NMF. Experimental results in comparison to other state-of-theart approaches are highly competitive.

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Section: A Interpretationmentioning

confidence: 95%

Section: Methodsmentioning

confidence: 99%

Simplicial nonnegative matrix factorization

Nguyen

Than

2013

The 2013 RIVF International Conference on Computing &Amp; Communication Technologies - Research, Innovation, and Vision for Fut

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“…23 Convex non-negative matrix factorization (convex-NMF) 24 is a variant of NMF that imposes a restriction over the source matrix S to be a convex combination of the input data vectors. This restriction significantly improves the quality of data representation of S. Unlike standard NMF, convex-NMF applies to both non-negative and mixed-sign data matrices.…”

Section: Non-negative Matrix Factorization (Nmf)mentioning

confidence: 99%

Pattern Recognition Analysis of MR Spectra

Ortega‐Martorell

Julià‐Sapé

Lisboa

et al. 2016

eMagRes

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The need for multivariate analysis of magnetic resonance spectroscopy (MRS) data was recognized about 20 years ago, when it became evident that spectral patterns were characteristic of some diseases. Despite this, there is no generally accepted methodology for performing pattern recognition (PR) analysis of MRS data sets. Here, the data acquisition and processing requirements for performing successful PR as applied to human MRS studies are introduced, and the main techniques for feature selection, extraction, and classification are described. These include methods of dimensionality reduction such as principal component analysis (PCA), independent component analysis (ICA), non-negative matrix factorization (NMF), and feature selection. Supervised methods such as linear discriminant analysis (LDA), logistic regression (LogR), and nonlinear classification are discussed separately from unsupervised and semisupervised classification techniques, including k -means clustering. Methods for testing and metrics for gauging the performance of PR models (sensitivity and specificity, the 'Confusion Matrix', 'k -fold cross-validation', 'Leave One Out', 'Bootstrapping', the 'Receiver Operating Characteristic curve', and balanced error and accuracy rates) are briefly described. This article ends with a summary of the main lessons learned from PR applied to MRS to date.

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“…Since the focus of this paper is validating the advantages of the deep dictionary learning framework, for simplicity, the dictionaries are learned by the convex semi-nonnegative matrix factorization [6], where the decomposition coefficient C i contains only non-negative elements. Noting the role of C i in representing the probability(abundance) that each voxel belongs to certain material types(end-member), this constraint is reasonable.…”

Section: Hierarchical Dictionary Learningmentioning

confidence: 99%

Learning Deep Dictionary for Hyperspectral Image Denoising

Huo

Feng

Huo

et al. 2015

IEICE Trans. Inf. & Syst.

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SUMMARYUsing traditional single-layer dictionary learning methods, it is difficult to reveal the complex structures hidden in the hyperspectral images. Motivated by deep learning technique, a deep dictionary learning approach is proposed for hyperspectral image denoising, which consists of hierarchical dictionary learning, feature denoising and fine-tuning. Hierarchical dictionary learning is helpful for uncovering the hidden factors in the spectral dimension, and fine-tuning is beneficial for preserving the spectral structure. Experiments demonstrate the effectiveness of the proposed approach. key words: dictionary learning, deep learning, hyperspectral image denoising, fine-tuning

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Convex and Semi-Nonnegative Matrix Factorizations

Cited by 1,099 publications

References 25 publications

Simplicial nonnegative matrix factorization

Simplicial nonnegative matrix factorization

Pattern Recognition Analysis of MR Spectra

Learning Deep Dictionary for Hyperspectral Image Denoising

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