类群分级半简单环

Zaqueu Cristiano, Wellington Marques de Souza, Javier Sánchez
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引用次数: 0

摘要

我们发展了类群分级半简单环的理论。我们的环既不是单素环,也不是单面自洽环。相反,它们展示了具有局部单元和局部自洽性的强版本,我们称之为$\Gamma_0$-自洽性。我们的主要结果之一是韦德伯恩-阿尔丁定理的类群分级版本,我们把类群分级半等分描述为分级简单 $\Gamma_0$-artinian 环的直接和,并展示了后一类环的结构。在这个方向上,我们还证明了雅各布森-切瓦利密度定理的一个类梯度版本。我们需要定义和研究在类群分级环上,特别是在类群分级环上的矩阵环(可能是无限大的)上的类群分级的性质。正因为如此,我们研究类群分级环及其分级模块。我们考虑了群似有级模块的自然自由度概念,当把它专门用于群似有级环时,就得到了通常的自由度概念,并证明对于群似有级分割环,所有有级模块都是自由的(在这个意义上)。与群分级的情况相反,有一些类群分级环,根据我们的定义,所有分级模块都是自由的,但它们不是分级划分环。我们展示了这类环的一个简单例子,并描述了类群分级半简单环中这类环的特征。我们还将类梯度半简单环与 B. Mitchell 定义的半简单范畴概念联系起来。为此,我们概括了 P. Gabriel 的一个结果,展示了从预增量范畴到非良性群的函子与与该范畴相关的群有级环上的有级模块之间的联系。我们描述了简单artinian范畴和B. Mitchell意义上从它们到非良性群的每个函数都是自由的范畴的特征。
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Groupoid Graded Semisimple Rings
We develop the theory of groupoid graded semisimple rings. Our rings are neither unital nor one-sided artinian. Instead, they exhibit a strong version of having local units and being locally artinian, and we call them $\Gamma_0$-artinian. One of our main results is a groupoid graded version of the Wedderburn-Artin Theorem, where we characterize groupoid graded semisimple rings as direct sums of graded simple $\Gamma_0$-artinian rings and we exhibit the structure of this latter class of rings. In this direction, we also prove a groupoid graded version of Jacobson-Chevalley density theorem. We need to define and study properties of groupoid gradings on matrix rings (possibly of infinite size) over groupoid graded rings, and specially over groupoid graded division rings. Because of that, we study groupoid graded division rings and their graded modules. We consider a natural notion of freeness for groupoid graded modules that, when specialized to group graded rings, gives the usual one, and show that for a groupoid graded division ring all graded modules are free (in this sense). Contrary to the group graded case, there are groupoid graded rings for which all graded modules are free according to our definition, but they are not graded division rings. We exhibit an easy example of this kind of rings and characterize such class among groupoid graded semisimple rings. We also relate groupoid graded semisimple rings with the notion of semisimple category defined by B. Mitchell. For that, we show the link between functors from a preadditive category to abelian groups and graded modules over the groupoid graded ring associated to this category, generalizing a result of P. Gabriel. We characterize simple artinian categories and categories for which every functor from them to abelian groups is free in the sense of B. Mitchell.
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