Symmetrization maps and minimal border rank Comon's conjecture
Abstract
One of the fundamental open problems in the field of tensors is the border Comon's conjecture: given a symmetric tensor F∈(Cn) d for d≥ 3, its border and symmetric border ranks are equal. In this paper, we prove the conjecture for large classes of concise tensors in (Cn) d of border rank n, i.e., tensors of minimal border rank. These families include all tame tensors and all tensors whenever n≤ d+1. Our technical tools are border apolarity and border varieties of sums of powers.
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