The interplay between bounded ranks of tensors arising from partitions

Abstract

Let d 2, h 1 be integers. Using a fragmentation technique, we characterise (h+1)-tuples (R1, …, Rh, R) of non-empty families of partitions of \1, …, d\ such that it suffices for an order-d tensor to have bounded Ri-rank for each i=1,…,h for it to have bounded R-rank. On the way, we prove power lower bounds on products of identity tensors that do not have rank 1, providing a qualitative answer to a question of Naslund.

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