Most secant varieties of tangential varieties to Veronese varieties are nondefective

Abstract

We prove a conjecture stated by Catalisano, Geramita, and Gimigliano in 2002, which claims that the secant varieties of tangential varieties to the dth Veronese embedding of the projective n-space Pn have the expected dimension, modulo a few well-known exceptions. As Bernardi, Catalisano, Gimigliano, and Id\'a demonstrated that the proof of this conjecture may be reduced to the case of cubics, i.e., d=3, the main contribution of this work is the resolution of this base case. The proposed proof proceeds by induction on the dimension n of the projective space via a specialization argument. This reduces the proof to a large number of initial cases for the induction, which were settled using a computer-assisted proof. The individual base cases were computationally challenging problems. Indeed, the largest base case required us to deal with the tangential variety to the third Veronese embedding of P79 in P88559.