English

Koszul complexes over Cohen-Macaulay rings

Commutative Algebra 2021-06-03 v3 Algebraic Geometry

Abstract

We prove a Cohen-Macaulay version of a result by Avramov-Golod and Frankild-J{\o}rgensen about Gorenstein rings, showing that if a noetherian ring AA is Cohen-Macaulay, and a1,,ana_1,\dots,a_n is any sequence of elements in AA, then the Koszul complex K(A;a1,,an)K(A;a_1,\dots,a_n) is a Cohen-Macaulay DG-ring. We further generalize this result, showing that it also holds for commutative DG-rings. In the process of proving this, we develop a new technique to study the dimension theory of a noetherian ring AA, by finding a Cohen-Macaulay DG-ring BB such that H0(B)=A\mathrm{H}^0(B) = A, and using the Cohen-Macaulay structure of BB to deduce results about AA. As application, we prove that if f:XYf:X \to Y is a morphism of schemes, where XX is Cohen-Macaulay and YY is nonsingular, then the homotopy fiber of ff at every point is Cohen-Macaulay. As another application, we generalize the miracle flatness theorem. Generalizations of these applications to derived algebraic geometry are also given.

Keywords

Cite

@article{arxiv.2005.10764,
  title  = {Koszul complexes over Cohen-Macaulay rings},
  author = {Liran Shaul},
  journal= {arXiv preprint arXiv:2005.10764},
  year   = {2021}
}

Comments

26 pages, final version, to appear in Advances in Mathematics

R2 v1 2026-06-23T15:43:19.284Z