English

A Geometric Approach to Orlov's Theorem

Algebraic Geometry 2019-02-20 v3 Category Theory

Abstract

A famous theorem of D. Orlov describes the derived bounded category of coherent sheaves on projective hypersurfaces in terms of an algebraic construction called graded matrix factorizations. In this article, I implement a proposal of E. Segal to prove Orlov's theorem in the Calabi-Yau setting using a globalization of the category of graded matrix factorizations (graded D-branes). Let X be a projective hypersurface. Already, Segal has established an equivalence between Orlov's category of graded matrix factorizations and the category of graded D-branes on the canonical bundle K of the ambient projective space. To complete the picture, I give an equivalence between the homotopy category of graded D-branes on K and Dcoh(X). This can be achieved directly and by deforming K to the normal bundle of X, embedded in K and invoking a global version of Kn\"{o}rrer periodicity. We also discuss an equivalence between graded D-branes on a general smooth quasi-projective variety and on the formal neighborhood of the singular locus of the zero fiber of the potential.

Keywords

Cite

@article{arxiv.1012.5282,
  title  = {A Geometric Approach to Orlov's Theorem},
  author = {Ian Shipman},
  journal= {arXiv preprint arXiv:1012.5282},
  year   = {2019}
}

Comments

27 pages. Extensively revised from previous version. Final version to appear in Compositio Mathematica

R2 v1 2026-06-21T17:03:45.237Z