Homological algebra for commutative monoids

J. Flores
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引用次数: 6

Abstract

We first study commutative, pointed monoids providing basic definitions and results in a manner similar commutative ring theory. Included are results on chain conditions, primary decomposition as well as normalization for a special class of monoids which lead to a study monoid schemes, divisors, Picard groups and class groups. It is shown that the normalization of a monoid need not be a monoid, but possibly a monoid scheme. After giving the definition of, and basic results for, $A$-sets, we classify projective $A$-sets and show they are completely determine by their rank. Subsequently, for a monoid $A$, we compute $K_0$ and $K_1$ and prove the Devissage Theorem for $G_0$. With the definition of short exact sequence for $A$-sets in hand, we describe the set $Ext(X,Y)$ of extensions for $A$-sets $X,Y$ and classify the set of square-zero extensions of a monoid $A$ by an $A$-set $X$ using the Hochschild cosimplicial set. We also examine the projective model structure on simplicial $A$-sets showcasing the difficulties involved in computing homotopy groups as well as determining the derived category for a monoid. The author defines the category $\operatorname{Da}(\mathcal{C})$ of double-arrow complexes for a class of non-abelian categories $\mathcal{C}$ and, in the case of $A$-sets, shows an adjunction with the category of simplicial $A$-sets.
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交换模群的同调代数
我们首先研究可交换的点模群,以类似于可交换环理论的方式给出了基本的定义和结果。给出了一类特殊单群的链条件、初等分解和归一化的结果,从而研究了一类单群方案、除数、Picard群和类群。证明了一元的归一化不一定是一元,但可能是一元格式。在给出了$A$集的定义和基本结果之后,我们对投影$A$集进行了分类,并证明它们完全由秩决定。随后,我们对一元$ a $计算了$K_0$和$K_1$,并证明了$G_0$的设计定理。有了A$-集合的短精确序列的定义,我们描述了A$-集合X,Y$的扩展集$Ext(X,Y)$,并利用Hochschild协简集对一元$A$的平方零扩展集$A$进行分类。我们还研究了简单$A$-集上的投影模型结构,展示了计算同伦群以及确定单群的派生范畴所涉及的困难。对于一类非阿贝尔范畴$\mathcal{C}$,定义了双箭头复形的范畴$\operatorname{Da}(\mathcal{C})$,并在$ a $-sets的情况下,给出了与简单$ a $-sets范畴的一个附加关系。
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