Power series rings and projectivity

R. -O. Buchweitz; H. Flenner

Power series rings and projectivity

Commutative Algebra 2007-05-23 v2

Authors: R. -O. Buchweitz , H. Flenner

Abstract

We show that a formal power series ring $A[[X]]$ over a noetherian ring $A$ is not a projective module unless $A$ is artinian. However, if $(A,{\mathfrak m})$ is local, then $A[[X]]$ behaves like a projective module in the sense that $Ext^p_A(A[[X]], M)=0$ for all ${\mathfrak m}$ -adically complete $A$ -modules. The latter result is shown more generally for any flat $A$ -module $B$ instead of $A[[X]]$ . We apply the results to the (analytic) Hochschild cohomology over complete noetherian rings.

Keywords

local cohomology commutative algebra module theory

Cite

@article{arxiv.math/0509180,
  title  = {Power series rings and projectivity},
  author = {R. -O. Buchweitz and H. Flenner},
  journal= {arXiv preprint arXiv:math/0509180},
  year   = {2007}
}

Comments

Mainly thanks to remarks and pointers by L.L.Avramov and S.Iyengar, we added further context and references. To appear in Manuscripta Mathematica. 7 pages

Power series rings and projectivity

Abstract

Keywords

Cite

Comments

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