On the singular loci of higher secant varieties of Veronese embeddings

Abstract

The k-th secant variety of a projective variety X ⊂ PN, denoted by σk(X), is defined to be the closure of the union of (k-1)-planes spanned by k points on X. In this paper, we examine the k-th secant variety σk(vd(Pn)) ⊂ PN of the image of the d-uple Veronese embedding vd of Pn to PN with N=n+dd-1, and focus on the singular locus of σk(vd(Pn)), which is only known for k3. To study the singularity for arbitrary k,d,n, we define the m-subsecant locus of σk(vd(Pn)) to be the union of σk(vd(Pm)) with any m-plane Pm ⊂ Pn. By investigating the projective geometry of moving embedded tangent spaces along subvarieties and using known results on the secant defectivity and the identifiability of symmetric tensors, we determine whether the m-subsecant locus is contained in the singular locus of σk(vd(Pn)) or not. Depending on the value of k, these subsecant loci show an interesting trichotomy between generic smoothness, non-trivial singularity, and trivial singularity. In many cases, they can be used as a new source for the singularity of the k-th secant variety of vd(Pn) other than the trivial one, the (k-1)-th secant variety of vd(Pn). We also consider the case of the 4-th secant variety of vd(Pn) by applying main results and computing conormal space via a certain type of Young flattening. Finally, we present some generalizations and discussions for further developments.