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Tensor decomposition

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In multilinear algebra, a tensor decomposition is any scheme for expressing a tensor as a sequence of elementary operations acting on other, often simpler tensors. Many tensor decompositions generalize some matrix decompositions.^[1]

The main tensor decompositions are:

tensor rank decomposition;
higher-order singular value decomposition;
Tucker decomposition;
matrix product states, and operators or tensor trains;
hierarchical Tucker decomposition; and
block term decomposition.

References

^ Bernardi, A.; Brachat, J.; Comon, P.; Mourrain, B. (2013-05-01). "General tensor decomposition, moment matrices and applications". Journal of Symbolic Computation. 52: 51–71. arXiv:1105.1229. doi:10.1016/j.jsc.2012.05.012. ISSN 0747-7171. S2CID 14181289.

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