English

Varieties with quadratic entry locus, I

Algebraic Geometry 2009-09-15 v3

Abstract

Quadratic entry locus manifold of type δ\delta XPNX\subset\mathbb P^N of dimension n1n\geq 1 are smooth projective varieties such that the locus described on XX by the points spanning secant lines passing through a general point of the secant variety SXPNSX\subseteq\mathbb P^N is a smooth quadric hypersurface of dimension δ=2n+1dim(SX)\delta=2n+1-\dim(SX) equal to the secant defect of XX. These manifolds appear widely and naturally among projective varieties having special geometric properties and/or extremal tangential behaviour. We prove that, letting δ=2rX+13\delta=2r_X +1\geq 3 or δ=2rX+2\delta=2r_X+2, then 2rX2^{r_X} divides nδn-\delta. This is obtained by the study of the projective geometry of the Hilbert scheme Yx(Tx)Y_x\subset \mathbb(T_x^*) of lines passing through a general point xx of XX, allowing an inductive procedure. The Divisibility Property described above allows unitary and simple proofs of many results on QELQEL-manifolds such as the complete classification of those of type δn/2\delta\geq n/2, of Cremona transformation of type (2,3)(2,3), (2,5)(2,5). In particular we propose a new and very short proof of the fact that Severi varieties have dimension 2,4, 8 or 16 and also an almost self contained half page proof of their classification due to Zak.

Keywords

Cite

@article{arxiv.math/0701889,
  title  = {Varieties with quadratic entry locus, I},
  author = {Francesco Russo},
  journal= {arXiv preprint arXiv:math/0701889},
  year   = {2009}
}

Comments

16 pages; some misprints and imprecisions corrected; some references added; final version as appeared in Math. Ann