Low-Rank Tensor Decomposition over Finite Fields

Published 12 Jan 2024 in cs.CC | (2401.06857v4)

Abstract: We show that finding rank-$R$ decompositions of a 3D tensor, for $R\le 4$, over a fixed finite field can be done in polynomial time. However, if some cells in the tensor are allowed to have arbitrary values, then rank-2 is NP-hard over the integers modulo 2. We also explore rank-1 decomposition of a 3D tensor and of a matrix where some cells are allowed to have arbitrary values.

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References (1)

Bläser, M. (2013). Fast Matrix Multiplication. Theory of Computing. https://theoryofcomputing.org/articles/gs005/

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Authors (1)

Jason Yang

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