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Abstract
We study the partially symmetric tensors T with low rank whose rank is not achieved by a unique set when the rank has an upper bound like , where
is the minimum of the entries of the multidegree
of T. For the proof, we use the Hilbert function of finite subsets of a product of projective spaces with respect to a Segre–Veronese embedding.
Notes
No potential conflict of interest was reported by the author.
Additional information
Funding
The author was partially supported by MIUR and GNSAGA of INdAM (Italy).