Recursive Koszul flattenings of determinant and permanent tensors
Abstract
We investigate new lower bounds on the tensor rank of the determinant and the permanent tensors via recursive usage of the Koszul flattening method introduced by Landsberg-Ottaviani and Hauenstein-Oeding-Ottaviani-Sommese. Our lower bounds on R (n) completely separate the determinant and the permanent tensors by their tensor ranks. Furthermore, we determine the exact tensor ranks R (4) = 12 and R (perm4) = 8 over arbitrary field of characteristic ≠ 2.
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