A DFT-based approximate eigenvalue and singular value decomposition of polynomial matrices

Tohidian, Mahdi; Amindavar, Hamidreza; Azimi, Reza

doi:10.1186/1687-6180-2013-93

Cited by 37 publications

(74 citation statements)

References 18 publications

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“…Even though eigenvalues and particularly eigenvectors are not guaranteed to exist as analytic functions in case of spectral majorisation, a number of algorithms targetting the McWhirter decomposition (5) have been created over the past decade (McWhirter and Baxter, 2004;McWhirter et al, 2007;Tkacenko and Vaidyanathan, 2006;Tkacenko, 2010;Redif et al, 2011;Tohidian et al, 2013;Corr et al, 2014c;Redif et al, 2015;Wang et al, 2015a). These all share the restriction of considering the EVD of a parahermitian matrix R(z) whose elements are Laurent polynomials, which may be enforced by estimating or approximating R[τ] over a finite lag windwo (Redif et al, 2011).…”

Section: Algorithms For Polynomial Matrix Evdmentioning

confidence: 99%

“…Also, (Tohidian et al, 2013) have presented a frequency domain algorithm which can favour analytic over spectrally majorised solutions (Coutts et al, 2017b;Coutts et al, 2018). A further route of investigation is the impact which estimation errors in the space-time covariance matrix have on the accuracy of the factorisation (Delaosa et al, 2018).…”

Section: Algorithms For Polynomial Matrix Evdmentioning

confidence: 99%

“…Over the past decade, a number of algorithms have emerged that implement a polynomial EVD Redif et al, 2011;Tohidian et al, 2013;Corr et al, 2014c;Redif et al, 2015;Wang et al, 2015a), and also triggered a range of applications in the area of filter banks (Redif et al, 2011;Weiss et al, 2006), beamforming Koh et al, 2009;Alrmah et al, 2011;Weiss et al, 2013;Vouras and Tran, 2014;Weiss et al, 2015;Alzin et al, 2016), communications (Weiss et al, 2006;Davies et al, 2007;Ta and Weiss, 2007a;Sandmann et al, 2015;Ahrens et al, 2017), or generic theoretical problems such as blind source separation (Redif et al, 2017) or spectral factorisation (Wang et al, 2015b).…”

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Extending Narrowband Descriptions and Optimal Solutions to Broadband Sensor Arrays

Weiss¹

2018

Proceedings of the 8th International Joint Conference on Pervasive and Embedded Computing and Communication Systems

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Abstract:This overview paper motivates the description of broadband sensor array problems by polynomial matrices, directly extending notation that is familiar from the characterisation of narrowband problems. To admit optimal solutions, the approach relies on extending the utility of the eigen-and singular value decompositions, by finding decompositions of such polynomial matrices. Particularly the factorisation of parahermitian polynomial matrices -including space-time covariance matrices that model the second order statistics of broadband sensor array data -is important. The paper summarises recent findings on the existence and uniqueness of the eigenvalue decomposition of such parahermitian polynomial matrices, demonstrates some algorithms that implement such factorisations, and highlights key applications where such techniques can provide advantages over state-of-the-art solutions.

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Section: Algorithms For Polynomial Matrix Evdmentioning

confidence: 99%

Section: Algorithms For Polynomial Matrix Evdmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Extending Narrowband Descriptions and Optimal Solutions to Broadband Sensor Arrays

Weiss¹

2018

Proceedings of the 8th International Joint Conference on Pervasive and Embedded Computing and Communication Systems

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“…Instead of a single campaign, now multiple measurement campaigns have been performed and the decompositions (17) and (18) are available for i = 1 . .…”

Section: Extraction Based On Multiple Campaignsmentioning

confidence: 99%

“…In case that eigenvalues intersect on the unit circle, spectral majorisation will enforce the approximation of non-analytic eigenvalues and -vectors. To guarantee analytic eigenvalues even in case of eigenvalues intersecting on the unit circle, algorithms different from SBR2 or SMD are required, with a DFT-base approach in [17] a first step.…”

Section: Iterative Pevd Algorithmsmentioning

confidence: 99%

Identification of Broadband Source-Array Responses from Sensor Second Order Statistics

Weiss

Goddard²,

Somasundaram

et al. 2017

2017 Sensor Signal Processing for Defence Conference (SSPD)

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Abstract-This paper addresses the identification of sourcesensor impulse responses from the measured space-time covariance matrix in the absence of any further side information about the source or the propagation environment. Using polynomial matrix decomposition techniques, the responses can be narrowed down to an indeterminacy of a common polynomial factor. If at least two different measurements for a source with constant power spectral density are available, this indeterminacy can be reduced to an ambiguity in the phase response of the sourcesensor paths.

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Application of the sequential matrix diagonalization algorithm to high-dimensional functional MRI data

Carcenac¹,

Redif

2019

Comput Stat

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This paper introduces an adaptation of the sequential matrix diagonalization (SMD) method to high-dimensional functional magnetic resonance imaging (fMRI) data. SMD is currently the most efficient statistical method to perform polynomial eigenvalue decomposition. Unfortunately, with current implementations based on dense polynomial matrices, the algorithmic complexity of SMD is intractable and it cannot be applied as such to high-dimensional problems. However, for certain applications, these polynomial matrices are mostly filled with null values and we have consequently developed an efficient implementation of SMD based on a GPU-parallel representation of sparse polynomial matrices. We then apply our "sparse SMD" to fMRI data, i.e. the temporal evolution of a large grid of voxels (as many as 29,328 voxels). Because of the energy compaction property of SMD, practically all the information is concentrated by SMD on the first polynomial principal component. Brain regions that are activated over time are thus reconstructed with great fidelity through analysis-synthesis based on the first principal component only, itself in the form of a sequence of polynomial parameters.

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A DFT-based approximate eigenvalue and singular value decomposition of polynomial matrices

Cited by 37 publications

References 18 publications

Extending Narrowband Descriptions and Optimal Solutions to Broadband Sensor Arrays

Extending Narrowband Descriptions and Optimal Solutions to Broadband Sensor Arrays

Identification of Broadband Source-Array Responses from Sensor Second Order Statistics

Application of the sequential matrix diagonalization algorithm to high-dimensional functional MRI data

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