English

Adic reduction to the diagonal and a relation between cofiniteness and derived completion

Commutative Algebra 2017-10-04 v3

Abstract

We prove two results about the derived functor of aa-adic completion: (1) Let KK be a commutative noetherian ring, let AA be a flat noetherian KK-algebra which is aa-adically complete with respect to some ideal aAa\subseteq A, such that A/aA/a is essentially of finite type over KK, and let M,NM,N be finitely generated AA-modules. Then adic reduction to the diagonal holds: AA^KAL(M^KLN)MALNA\otimes^{L}_{ A\hat{\otimes}_{K} A } ( M\hat{\otimes}^{L}_{K} N ) \cong M \otimes^{L}_A N. A similar result is given in the case where M,NM,N are not necessarily finitely generated. (2) Let AA be a commutative ring, let aAa\subseteq A be a weakly proregular ideal, let MM be an AA-module, and assume that the aa-adic completion of AA is noetherian (if AA is noetherian, all these conditions are always satisfied). Then \mboxExtAi(A/a,M)\mbox{Ext}^i_A(A/a,M) is finitely generated for all i0i\ge 0 if and only if the derived aa-adic completion \LΛ^a(M)\L\hat{\Lambda}_{a}(M) has finitely generated cohomologies over A^\hat{A}. The first result is a far reaching generalization of a result of Serre, who proved this in case KK is a field or a discrete valuation ring and A=K[[x1,,xn]]A = K[[x_1,\dots,x_n]].

Keywords

Cite

@article{arxiv.1602.03874,
  title  = {Adic reduction to the diagonal and a relation between cofiniteness and derived completion},
  author = {Liran Shaul},
  journal= {arXiv preprint arXiv:1602.03874},
  year   = {2017}
}

Comments

12 pages. Final version, to appear in Proceedings of the AMS

R2 v1 2026-06-22T12:48:39.065Z