Abstract
Let X ⊂ PN be a nondegenerate irreducible closed subvariety of dimension n over the field of complex numbers and let SX ⊂ PN be its secant variety. X ⊂ PN is called 'secant defective' if dim(SX) is strictly less than the expected dimension 2n + 1. In a 1993 paper, F.L Zak showed that for a 'secant defective' manifold it is necessary that and that the Veronese variety v2(Pn) is the only boundary case. Recently R. Muñoz, J. C. Sierra, and L. E. Solá Conde classified secant defective varieties next to this extremal case. In this paper, we will consider secant defective manifolds X ⊂ PN of dimension n with for ∈ ≥ 0. First, we will prove that X is an LQEL-manifold of type δ = 1 for ∈ ≤ n - 2 by showing that the tangential behavior of X is good enough to apply the Scorza lemma. Then we will completely describe the above manifolds by using the classification of conic-connected manifolds given by Ionescu and Russo. Our method generalizes previous results by Zak, and by Muñoz, Sierra, and Solá Conde.
Original language | English |
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Pages (from-to) | 39-46 |
Number of pages | 8 |
Journal | Proceedings of the American Mathematical Society |
Volume | 142 |
Issue number | 1 |
DOIs | |
State | Published - Jan 2014 |
Keywords
- Conic-connected
- Local quadratic entry locus
- Scorza lemma
- Secant defective
- Second fundamental form
- Tangential projection
- Terracini lemma