English

\v{C}ech (co-) complexes as Koszul complexes and applications

Commutative Algebra 2020-03-19 v1

Abstract

Let Cˇx\check{C}_{\underline{x}} denote the \v{C}ech complex with respect to a system of elements x=x1,,xr\underline{x} = x_1,\ldots,x_r of a commutative ring RR. We construct a bounded complex Lx\mathcal{L}_{\underline{x}} of free RR-modules and a quasi-isomorphism LxCˇx\mathcal{L}_{\underline{x}} \stackrel{\sim}{\longrightarrow} \check{C}_{\underline{x}} and isomorphisms LxRXK(xU;X[U1])\mathcal{L}_{\underline{x}} \otimes_R X \cong K^{\bullet}(\underline{x}-\underline{U}; X[\underline{U}^{-1}]) and HomR(Lx,X)K(xU;X[[U]])\operatorname{Hom}_R(\mathcal{L}_{\underline{x}},X) \cong K_{\bullet}(\underline{x}-\underline{U};X[[\underline{U}]]) for an RR-complex XX. Here xU\underline{x} - \underline{U} denotes the sequence of elements x1U1,,xrUrx_1-U_1,\ldots,x_r-U_r in the polynomial ring R[U]=R[U1,,Ur]R[\underline{U}] = R[U_1,\ldots,U_r] in the variables U=U1,,Ur\underline{U}= U_1,\ldots,U_r over RR. Moreover X[[U]]X[[\underline{U}]] denotes the formal power series complex of XX in U\underline{U} and X[U1]X[\underline{U}^{-1}] denotes the complex of inverse polynomials of XX in U\underline{U}. Furthermore K(xU;X[[U]])K_{\bullet}(\underline{x}-\underline{U};X[[\underline{U}]]) resp. K(xU;X[U1])K^{\bullet}(\underline{x}-\underline{U}; X[\underline{U}^{-1}]) denotes the corresponding Koszul complex resp. the corresponding Koszul co-complex. In particular, there is a bounded RR-free resolution of Cˇx\check{C}_{\underline{x}} by a certain Koszul complex. This has various consequences e.g. in the case when x\underline{x} is a weakly pro-regular sequence. Under this additional assumption it follows that the local cohomology HxRi(X)H^i_{\underline{x} R}(X) and the left derived functors of the completion ΛixR(X),iZ,\Lambda_i^{\underline{x} R}(X), i \in \mathbb{Z}, is a certain Koszul cohomology and Koszul homology resp. This provides new approaches to the right derived functor of torsion and the left derived functor of completion with various applications.

Keywords

Cite

@article{arxiv.2003.07855,
  title  = {\v{C}ech (co-) complexes as Koszul complexes and applications},
  author = {Peter Schenzel},
  journal= {arXiv preprint arXiv:2003.07855},
  year   = {2020}
}
R2 v1 2026-06-23T14:17:45.420Z