Tensor decomposition beyond uniqueness, with an application to the minrank problem
Computational Complexity
2025-10-31 v1 Discrete Mathematics
Data Structures and Algorithms
Rings and Algebras
Representation Theory
Abstract
We prove a generalization to Jennrich's uniqueness theorem for tensor decompositions in the undercomplete setting. Our uniqueness theorem is based on an alternative definition of the standard tensor decomposition, which we call matrix-vector decomposition. Moreover, in the same settings in which our uniqueness theorem applies, we also design and analyze an efficient randomized algorithm to compute the unique minimum matrix-vector decomposition (and thus a tensor rank decomposition of minimum rank). As an application of our uniqueness theorem and our efficient algorithm, we show how to compute all matrices of minimum rank (up to scalar multiples) in certain generic vector spaces of matrices.
Cite
@article{arxiv.2510.26587,
title = {Tensor decomposition beyond uniqueness, with an application to the minrank problem},
author = {Pascal Koiran and Rafael Oliveira},
journal= {arXiv preprint arXiv:2510.26587},
year = {2025}
}