English

Thom-Sebastiani & Duality for Matrix Factorizations

Algebraic Geometry 2011-02-01 v1 Category Theory

Abstract

The derived category of a hypersurface has an action by "cohomology operations" k[t], deg t=-2, underlying the 2-periodic structure on its category of singularities (as matrix factorizations). We prove a Thom-Sebastiani type Theorem, identifying the k[t]-linear tensor products of these dg categories with coherent complexes on the zero locus of the sum potential on the product (with a support condition), and identify the dg category of colimit-preserving k[t]-linear functors between Ind-completions with Ind-coherent complexes on the zero locus of the difference potential (with a support condition). These results imply the analogous statements for the 2-periodic dg categories of matrix factorizations. Some applications include: we refine and establish the expected computation of 2-periodic Hochschild invariants of matrix factorizations; we show that the category of matrix factorizations is smooth, and is proper when the critical locus is proper; we show how Calabi-Yau structures on matrix factorizations arise from volume forms on the total space; we establish a version of Kn\"orrer Periodicity for eliminating metabolic quadratic bundles over a base.

Keywords

Cite

@article{arxiv.1101.5834,
  title  = {Thom-Sebastiani & Duality for Matrix Factorizations},
  author = {Anatoly Preygel},
  journal= {arXiv preprint arXiv:1101.5834},
  year   = {2011}
}

Comments

78 pages. Draft

R2 v1 2026-06-21T17:19:02.929Z