Workshop
On the identifiability of symmetric tensors beyond the Kruskal's bound
- Elena Angelini (Università di Siena, Siena, Italy)
Abstract
I will discuss how the study of the Hilbert function and Cayley-Bacharach property of finite subsets in the complex projective space provide information on the minimality and identifiability of symmetric tensors, even beyond the range of applicability of Kruskal's criterion. As an application, I will describe some examples in the case of ternary forms. (joint works with Luca Chiantini, Andrea Mazzon, Nick Vannieuwenhoven).
