中文

Mukai flops and derived categories

代数几何 2007-05-23 v2

摘要

In this note, we shall prove that two smooth projective varieties of dim 2n connected by a Mukai flop have equivalent bounded derived categories. More precisely, let ϕ:XX+\phi : X - - \to X^+ be a Mukai flop with centers YXY \subset X and Y+X+Y^+ \subset X^+. In our case, the natural fuctor Φ:D(X)D(X+)\Phi : D(X) \to D(X^+) defined by the graph of ϕ\phi is not fully faithful. Instead, let XXˉX \to {\bar X} and X+XˉX^+ \to {\bar X} be the birational contraction maps of the centers, and put {\hat X} := X \times_{{\bar X} X^+. Then X^{\hat X} is a normal crossing variety with two irreducible components. This X^{\hat X} defines a functor Ψ:D(X)D(X+)\Psi : D(X) \to D(X^+). We shall prove that this Ψ\Psi is an equivalence. Recently, Wierzba and Wisniewski have announced that two birationally equivalent, complex projective symplectic 4-folds are connected by a finite sequence of Mukai flops. Our result with this shows that D(X)D(X) is a birational invariant for complex projective symplectic 4-folds.

关键词

引用

@article{arxiv.math/0203287,
  title  = {Mukai flops and derived categories},
  author = {Yoshinori Namikawa},
  journal= {arXiv preprint arXiv:math/0203287},
  year   = {2007}
}

备注

revised version