Maximal and typical nonnegative ranks of nonnegative tensors

Abstract

Let N1, …, Nd be positive integers with N1≤·s≤ Nd. Set N=N1·s Nd-1. We show in this paper that an integer r is a typical nonnegative rank of nonnegative tensors of format N1×·s× Nd if and only if r≤ N and r is greater than or equals to the generic rank of tensors over C of format N1×·s× Nd. We also show that the maximal nonnegative rank of nonnegative tensors of format N1×·s× Nd is N.