Typical rank of m× n× (m-1)n tensors with 3≤ m≤ n over the real number field

Abstract

Tensor type data are used recently in various application fields, and then a typical rank is important. Let 3≤ m≤ n. We study typical ranks of m× n× (m-1)n tensors over the real number field. Let be the Hurwitz-Radon function defined as (n)=2b+8c for nonnegative integers a,b,c such that n=(2a+1)2b+4c and 0≤ b<4. If m ≤ (n), then the set of m× n× (m-1)n tensors has two typical ranks (m-1)n,(m-1)n+1. In this paper, we show that the converse is also true: if m > (n), then the set of m× n× (m-1)n tensors has only one typical rank (m-1)n.