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Nonnegative approximations of nonnegative tensorsLIM, Lek-Heng; COMON, Pierre.Journal of chemometrics. 2009, Vol 23, Num 7-8, pp 432-441, issn 0886-9383, 10 p.Article

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Boolean circuits, tensor ranks, and communication complexityPUDLAK, P; RÖDL, V; SGALL, J et al.SIAM journal on computing (Print). 1997, Vol 26, Num 3, pp 605-633, issn 0097-5397Article

Tensor ranks for the inversion of tensor-product binomialsTYRTYSHNIKOV, Eugene.Journal of computational and applied mathematics. 2010, Vol 234, Num 11, pp 3170-3174, issn 0377-0427, 5 p.Article

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KRYLOV SUBSPACE METHODS FOR LINEAR SYSTEMS WITH TENSOR PRODUCT STRUCTUREKRESSNER, Daniel; TOBLER, Christine.SIAM journal on matrix analysis and applications. 2010, Vol 31, Num 4, pp 1688-1714, issn 0895-4798, 27 p.Article

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