Pro-nilpotently extended dgca-s 和 SH Lie-Rinehart 对

arXiv - MATH - Algebraic Topology Pub Date : 2024-06-16 DOI:arxiv-2406.10883

Damjan Pištalo

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引用次数: 0

摘要

介绍了原无势扩展微分级数交换代数范畴。切瓦利-艾伦伯格构造提供了它的某个全子类与强同调李-芮恩哈特对的全子类之间的等价性，强同调李-芮恩哈特对由对$(A,M)$组成，其中$M$是平的分级$A$模块。通过证明它们的切瓦利-艾伦伯格复数构成了一个共纤对象范畴，可以证明对$(A,M)$（其中$A$是一个半自由的dgca，$M$是$\op{Mod}(A)$中的一个单元复数）构成了一个纤对象范畴。

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Pro-nilpotently extended dgca-s and SH Lie-Rinehart pairs

Category of pro-nilpotently extended differential graded commutative algebras is introduced. Chevalley-Eilenberg construction provides an equivalence between its certain full subcategory and the opposite to the full subcategory of strong homotopy Lie Rinehart pairs with strong homotopy morphisms, consisting of pairs $(A,M)$ where $M$ is flat as a graded $A$-module. It is shown that pairs $(A,M)$, where $A$ is a semi-free dgca and $M$ a cell complex in $\op{Mod}(A)$, form a category of fibrant objects by proving that their Chevalley-Eilenberg complexes form a category of cofibrant objects.

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arXiv - MATH - Algebraic Topology

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