Jouhayna Harmouch scite author profile

Jouhayna Harmouch

3Publications

17Citation Statements Received

40Citation Statements Given

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Affiliations

French Institute for Research in Computer Science and Automation, Lebanese University

Publications

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Structured low rank decomposition of multivariate Hankel matrices

Harmouch

Khalil

Mourrain

2018

Linear Algebra and its Applications

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We study the decomposition of a multivariate Hankel matrix H σ as a sum of Hankel matrices of small rank in correlation with the decomposition of its symbol σ as a sum of polynomial-exponential series. We present a new algorithm to compute the low rank decomposition of the Hankel operator and the decomposition of its symbol exploiting the properties of the associated Artinian Gorenstein quotient algebra A σ . A basis of A σ is computed from the Singular Value Decomposition of a sub-matrix of the Hankel matrix H σ . The frequencies and the weights are deduced from the generalized eigenvectors of pencils of shifted sub-matrices of H σ . Explicit formula for the weights in terms of the eigenvectors avoid us to solve a Vandermonde system. This new method is a multivariate generalization of the so-called Pencil method for solving Prony-type decomposition problems. We analyse its numerical behaviour in the presence of noisy input moments, and describe a rescaling technique which improves the numerical quality of the reconstruction for frequencies of high amplitudes. We also present a new Newton iteration, which converges locally to the closest multivariate Hankel matrix of low rank and show its impact for correcting errors on input moments.

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Decomposition of Low Rank Multi-symmetric Tensor

Harmouch¹,

Mourrain²,

Khalil³

2017

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Structured low rank decomposition of multivariate Hankel matrices

Harmouch¹,

Khalil²,

Mourrain³

2017

Preprint

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