Low-Dimensional Polytope Approximation and Its Applications to Nonnegative Matrix Factorization

Chu, Moody T.; Lin, Matthew M.

doi:10.1137/070680436

Cited by 23 publications

(17 citation statements)

References 21 publications

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“…Several approaches for solving the NLS subproblems proposed in NMF literature are discussed in Sect. 4 [18,42,51,53,59,71]. According to Theorem 1, the convergence property of the ANLS framework can be stated as follows.…”

Section: Theorem 1 Suppose F Is Continuously Differentiable Inmentioning

confidence: 99%

“…The convergence property of the scalar block case is similar to that of the vector block case. (18) are attained at each step, every limit point of the sequence (W, H) (i) generated by the BCD method with K (M + N ) scalar blocks is a stationary point of (2).…”

Section: Bcd With K (M + N ) Scalar Blocksmentioning

confidence: 99%

“…In the ANLS method, the subproblems appear as the nonnegativity constrained least squares (NLS) problems. Much research has been devoted to design NMF algorithms based on efficient methods to solve the NLS subproblems [18,42,51,53,59,71]. A review of many successful algorithms for the NLS subproblems is provided in Sect.…”

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Algorithms for nonnegative matrix and tensor factorizations: a unified view based on block coordinate descent framework

2013

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We review algorithms developed for nonnegative matrix factorization (NMF) and nonnegative tensor factorization (NTF) from a unified view based on the block coordinate descent (BCD) framework. NMF and NTF are low-rank approximation methods for matrices and tensors in which the low-rank factors are constrained to have only nonnegative elements. The nonnegativity constraints have been shown to enable natural interpretations and allow better solutions in numerous applications including text analysis, computer vision, and bioinformatics. However, the computation of NMF and NTF remains challenging and expensive due the constraints. Numerous algorithmic approaches have been proposed to efficiently compute NMF and NTF. The BCD framework in constrained non-linear optimization readily explains the theoretical convergence properties of several efficient NMF and NTF algorithms, which are consistent with experimental observations reported in literature. In addition, we discuss algorithms that do not fit in the BCD framework contrasting them from those based on the BCD framework. With insights acquired from the unified perspective, we also propose efficient algorithms for updating NMF when there is a small change in the reduced dimension or in the data. The effectiveness of the proposed updating algorithms are validated experimentally with synthetic and real-world data sets.

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Section: Theorem 1 Suppose F Is Continuously Differentiable Inmentioning

confidence: 99%

Section: Bcd With K (M + N ) Scalar Blocksmentioning

confidence: 99%

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Algorithms for nonnegative matrix and tensor factorizations: a unified view based on block coordinate descent framework

2013

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“…The points in P S (I−1) (Y ) form the convex polytope C(Y ) (Chu and Lin, 2008). If the matrix X is sufficiently sparse (see Definition 2), the vertices of C(Y ) correspond to those column vectors of A that intersect with S (I−1) .…”

Section: Geometrical Interpretationmentioning

confidence: 99%

Regularized nonnegative matrix factorization: Geometrical interpretation and application to spectral unmixing

Zdunek

2014

International Journal of Applied Mathematics and Computer Science

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Nonnegative Matrix Factorization (NMF) is an important tool in data spectral analysis. However, when a mixing matrix or sources are not sufficiently sparse, NMF of an observation matrix is not unique. Many numerical optimization algorithms, which assure fast convergence for specific problems, may easily get stuck into unfavorable local minima of an objective function, resulting in very low performance. In this paper, we discuss the Tikhonov regularized version of the Fast Combinatorial NonNegative Least Squares (FC-NNLS) algorithm (proposed by Benthem and Keenan in 2004), where the regularization parameter starts from a large value and decreases gradually with iterations. A geometrical analysis and justification of this approach are presented. The numerical experiments, carried out for various benchmarks of spectral signals, demonstrate that this kind of regularization, when applied to the FC-NNLS algorithm, is essential to obtain good performance.

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“…It has been proved that the above algorithm converges into a local minimum. Other techniques, such as alternating nonnegative least squares method or bound-constrained optimization algorithms, such as projected gradient method, have also been used when additional constraints are added to the nonnegativity of the matrices W or H [34][35][36].…”

Section: Classical Algorithmmentioning

confidence: 99%

Nonnegative Matrix Factorizations Performing Object Detection and Localization

Casalino

Buono

Minervini

2012

Applied Computational Intelligence and Soft Computing

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We study the problem of detecting and localizing objects in still, gray-scale images making use of the part-based representation provided by nonnegative matrix factorizations. Nonnegative matrix factorization represents an emerging example of subspace methods, which is able to extract interpretable parts from a set of template image objects and then to additively use them for describing individual objects. In this paper, we present a prototype system based on some nonnegative factorization algorithms, which differ in the additional properties added to the nonnegative representation of data, in order to investigate if any additional constraint produces better results in general object detection via nonnegative matrix factorizations.

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Low-Dimensional Polytope Approximation and Its Applications to Nonnegative Matrix Factorization

Cited by 23 publications

References 21 publications

Algorithms for nonnegative matrix and tensor factorizations: a unified view based on block coordinate descent framework

Algorithms for nonnegative matrix and tensor factorizations: a unified view based on block coordinate descent framework

Regularized nonnegative matrix factorization: Geometrical interpretation and application to spectral unmixing

Nonnegative Matrix Factorizations Performing Object Detection and Localization

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