On the partially symmetric rank of tensor products of W-states and other symmetric tensors

Abstract

Given tensors T and T' of order k and k' respectively, the tensor product T T' is a tensor of order k+k'. It was recently shown that the tensor rank can be strictly submultiplicative under this operation ([Christandl-Jensen-Zuiddam]). We study this phenomenon for symmetric tensors where additional techniques from algebraic geometry become available. The tensor product of symmetric tensors results in a partially symmetric tensor and our results amount to bounds on the partially symmetric rank. Following motivations from algebraic complexity theory and quantum information theory, we focus on the so-called "W-states", namely monomials of the form xd-1y, and on products of such. In particular, we prove that the partially symmetric rank of xd1 -1y ... xdk-1 y is at most 2k-1(d1+ ... +dk).