尼曼平面和射影模定理的等模概化

Leonid Positselski
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引用次数: 0

摘要

本文建立在 arXiv:2306.02734 的基础之上。我们考虑了一个完整的、分离的拓扑环 $\mathfrak R$,它有一个由开放的两面理想组成的零邻域的可数基。主要结果是投影左$\mathfrak R$-contramodules 的同调范畴等价于平面左$\mathfrak R$-contramodules 的精确范畴的派生范畴。换句话说,当且仅当一个平面$\mathfrak R$-contramodules 的复数是一个具有平面$\mathfrak R$-contramodules 的共环的无环复数时,它才是贝克尔意义上的反循环复数。
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A contramodule generalization of Neeman's flat and projective module theorem
This paper builds on top of arXiv:2306.02734. We consider a complete, separated topological ring $\mathfrak R$ with a countable base of neighborhoods of zero consisting of open two-sided ideals. The main result is that the homotopy category of projective left $\mathfrak R$-contramodules is equivalent to the derived category of the exact category of flat left $\mathfrak R$-contramodules. In other words, a complex of flat $\mathfrak R$-contramodules is contraacyclic in the sense of Becker if and only if it is an acyclic complex with flat $\mathfrak R$-contramodules of cocycles.
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