English

A criterion for I-adic completeness

Commutative Algebra 2013-12-16 v1

Abstract

Let II denote an ideal in a commutative Noetherian ring RR. Let MM be an RR-module. The II-adic completion is defined by M^I=limαM/IαM\hat{M}^I = \varprojlim{}_{\alpha} M/I^{\alpha}M. Then MM is called II-adic complete whenever the natural homomorphism MM^IM \to \hat{M}^I is an isomorphism. Let MM be II-separated, i.e. αIαM=0\cap_{\alpha} I^{\alpha}M = 0. In the main result of the paper it is shown that MM is II-adic complete if and only if \ExtR1(F,M)=0\Ext_R^1(F,M) = 0 for the flat test module F=i=1rRxiF = \oplus_{i = 1}^r R_{x_i} where {x1,,xr}\{x_1,\ldots,x_r\} is a system of elements such that \RadI=\Rad\xxR\Rad I = \Rad \xx R. This result extends several known statements starting with C. U. Jensen's result (see \cite[Proposition 3]{J}) that a finitely generated RR-module MM over a local ring RR is complete if and only if \ExtR1(F,M)=0\Ext^1_R(F,M) = 0 for any flat RR-module FF.

Keywords

Cite

@article{arxiv.1312.3908,
  title  = {A criterion for I-adic completeness},
  author = {Peter Schenzel},
  journal= {arXiv preprint arXiv:1312.3908},
  year   = {2013}
}

Comments

to appear in Archiv der Math

R2 v1 2026-06-22T02:27:18.668Z