SemOpenAlex |

SemOpenAlex

Matches in SemOpenAlex for { <https://semopenalex.org/work/W4200542446> ?p ?o ?g. }

Showing items 1 to 100 of ±112 with 100 items per page.

W4200542446 endingPage "211" @default.
W4200542446 startingPage "175" @default.
W4200542446 abstract "The Symmetric Tensor Approximation problem (STA) consists of approximating a symmetric tensor or a homogeneous polynomial by a linear combination of symmetric rank-1 tensors or powers of linear forms of low symmetric rank. We present two new Riemannian Newton-type methods for low rank approximation of symmetric tensor with complex coefficients. The first method uses the parametrization of the set of tensors of rank at most r by weights and unit vectors. Exploiting the properties of the apolar product on homogeneous polynomials combined with efficient tools from complex optimization, we provide an explicit and tractable formulation of the Riemannian gradient and Hessian, leading to Newton iterations with local quadratic convergence. We prove that under some regularity conditions on non-defective tensors in the neighborhood of the initial point, the Newton iteration (completed with a trust-region scheme) is converging to a local minimum. The second method is a Riemannian Gauss–Newton method on the Cartesian product of Veronese manifolds. An explicit orthonormal basis of the tangent space of this Riemannian manifold is described. We deduce the Riemannian gradient and the Gauss–Newton approximation of the Riemannian Hessian. We present a new retraction operator on the Veronese manifold. We analyze the numerical behavior of these methods, with an initial point provided by Simultaneous Matrix Diagonalisation (SMD). Numerical experiments show the good numerical behavior of the two methods in different cases and in comparison with existing state-of-the-art methods." @default.
W4200542446 created "2021-12-31" @default.
W4200542446 creator A5003683965 @default.
W4200542446 creator A5019774314 @default.
W4200542446 creator A5032080293 @default.
W4200542446 date "2022-03-01" @default.
W4200542446 modified "2023-09-27" @default.
W4200542446 title "Riemannian Newton optimization methods for the symmetric tensor approximation problem" @default.
W4200542446 cites W1964650132 @default.
W4200542446 cites W1966810449 @default.
W4200542446 cites W1970935148 @default.
W4200542446 cites W1986370957 @default.
W4200542446 cites W1989811026 @default.
W4200542446 cites W2000215628 @default.
W4200542446 cites W2007715285 @default.
W4200542446 cites W2013912476 @default.
W4200542446 cites W2014617517 @default.
W4200542446 cites W2018282388 @default.
W4200542446 cites W2024165284 @default.
W4200542446 cites W2028324955 @default.
W4200542446 cites W2037181643 @default.
W4200542446 cites W2039748980 @default.
W4200542446 cites W2047680880 @default.
W4200542446 cites W2055913665 @default.
W4200542446 cites W2066392792 @default.
W4200542446 cites W2081962379 @default.
W4200542446 cites W2088221456 @default.
W4200542446 cites W2093736060 @default.
W4200542446 cites W2098760944 @default.
W4200542446 cites W2102892751 @default.
W4200542446 cites W2126381689 @default.
W4200542446 cites W2154021490 @default.
W4200542446 cites W2167993374 @default.
W4200542446 cites W2258054274 @default.
W4200542446 cites W2558791369 @default.
W4200542446 cites W2581199805 @default.
W4200542446 cites W2963161459 @default.
W4200542446 cites W2964053826 @default.
W4200542446 cites W3104141160 @default.
W4200542446 cites W3104308530 @default.
W4200542446 cites W4237324918 @default.
W4200542446 cites W4289784446 @default.
W4200542446 cites W4297913868 @default.
W4200542446 cites W50417968 @default.
W4200542446 doi "https://doi.org/10.1016/j.laa.2021.12.008" @default.
W4200542446 hasPublicationYear "2022" @default.
W4200542446 type Work @default.
W4200542446 citedByCount "1" @default.
W4200542446 countsByYear W42005424462022 @default.
W4200542446 crossrefType "journal-article" @default.
W4200542446 hasAuthorship W4200542446A5003683965 @default.
W4200542446 hasAuthorship W4200542446A5019774314 @default.
W4200542446 hasAuthorship W4200542446A5032080293 @default.
W4200542446 hasBestOaLocation W42005424461 @default.
W4200542446 hasConcept C114614502 @default.
W4200542446 hasConcept C134306372 @default.
W4200542446 hasConcept C148125525 @default.
W4200542446 hasConcept C155281189 @default.
W4200542446 hasConcept C157157409 @default.
W4200542446 hasConcept C164226766 @default.
W4200542446 hasConcept C166077713 @default.
W4200542446 hasConcept C181104567 @default.
W4200542446 hasConcept C20178491 @default.
W4200542446 hasConcept C202444582 @default.
W4200542446 hasConcept C203616005 @default.
W4200542446 hasConcept C2779593128 @default.
W4200542446 hasConcept C28826006 @default.
W4200542446 hasConcept C33923547 @default.
W4200542446 hasConcept C520416788 @default.
W4200542446 hasConcept C64835786 @default.
W4200542446 hasConceptScore W4200542446C114614502 @default.
W4200542446 hasConceptScore W4200542446C134306372 @default.
W4200542446 hasConceptScore W4200542446C148125525 @default.
W4200542446 hasConceptScore W4200542446C155281189 @default.
W4200542446 hasConceptScore W4200542446C157157409 @default.
W4200542446 hasConceptScore W4200542446C164226766 @default.
W4200542446 hasConceptScore W4200542446C166077713 @default.
W4200542446 hasConceptScore W4200542446C181104567 @default.
W4200542446 hasConceptScore W4200542446C20178491 @default.
W4200542446 hasConceptScore W4200542446C202444582 @default.
W4200542446 hasConceptScore W4200542446C203616005 @default.
W4200542446 hasConceptScore W4200542446C2779593128 @default.
W4200542446 hasConceptScore W4200542446C28826006 @default.
W4200542446 hasConceptScore W4200542446C33923547 @default.
W4200542446 hasConceptScore W4200542446C520416788 @default.
W4200542446 hasConceptScore W4200542446C64835786 @default.
W4200542446 hasLocation W42005424461 @default.
W4200542446 hasLocation W42005424462 @default.
W4200542446 hasLocation W42005424463 @default.
W4200542446 hasLocation W42005424464 @default.
W4200542446 hasLocation W42005424465 @default.
W4200542446 hasLocation W42005424466 @default.
W4200542446 hasLocation W42005424467 @default.
W4200542446 hasLocation W42005424468 @default.
W4200542446 hasOpenAccess W4200542446 @default.
W4200542446 hasPrimaryLocation W42005424461 @default.
W4200542446 hasRelatedWork W1986399599 @default.
W4200542446 hasRelatedWork W2009425602 @default.