English

Pfaffian Subschemes

alg-geom 2008-02-03 v1 Algebraic Geometry

Abstract

A subscheme XPn+3X\subset \Bbb P^{n+3} of codimension 33 is {\em Pfaffian} if it is the degeneracy locus of a skew-symmetric map f:E\spcheck(t)@>>>Ef:\cal{E}\spcheck(-t) @>>> \cal{E} with E\cal{E} a locally free sheaf of odd rank on Pn+3\Bbb P^{n+3}. It is shown that a codimension 33 subscheme XPn+3X\subset\Bbb P^{n+3} is Pfaffian if and only if it is locally Gorenstein, subcanonical (i.e.\ ωXOX(l)\omega_X\cong\cal O_X(l) for some integer ll), and the following parity condition holds: if n0(mod4)n\equiv 0\pmod{4} and ll is even, then χ(OX(l/2))\chi (\cal O_X (l/2)) is also even. The paper includes a modern version of the Horrocks correspondence, stated in the language of derived categories. A local analogue of the main theorem is also proved.

Cite

@article{arxiv.alg-geom/9406005,
  title  = {Pfaffian Subschemes},
  author = {Charles H. Walter},
  journal= {arXiv preprint arXiv:alg-geom/9406005},
  year   = {2008}
}

Comments

26 pages, AMS-LaTeX