交换单元的安德烈-奎伦同调

Pub Date : 2024-04-09 DOI:10.1007/s00233-024-10423-z

Bhavya Agrawalla, Nasief Khlaif, Haynes Miller

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引用次数: 0

摘要

我们注意到，换元单元的贝克模块正是与该单元相关的分级换元环的模块。在这种识别下，交换单元的奎伦同调是有级交换环的安德烈-奎伦同调的特例，这推广了库尔迪亚尼和皮拉什维利的一个结果。为了验证这一点，我们开发了必要的分级形式主义。皮埃尔-格里莱（Pierre Grillet）为计算奎伦同调而开发的部分共链复数是迈克尔-巴尔（Michael Barr）建议的哈里森共链复数修正的起点。

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The André–Quillen cohomology of commutative monoids

We observe that Beck modules for a commutative monoid are exactly modules over a graded commutative ring associated to the monoid. Under this identification, the Quillen cohomology of commutative monoids is a special case of the André–Quillen cohomology for graded commutative rings, generalizing a result of Kurdiani and Pirashvili. To verify this we develop the necessary grading formalism. The partial cochain complex developed by Pierre Grillet for computing Quillen cohomology appears as the start of a modification of the Harrison cochain complex suggested by Michael Barr.

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