与分级左$A-$模的分级左$A-$模的分类$G_{r}(A- mod)$相关联的复类$COMP(G_{r}(A- mod))$的定位

IF 1 Q1 MATHEMATICS

European Journal of Pure and Applied Mathematics Pub Date : 2023-07-30 DOI:10.29020/nybg.ejpam.v16i3.4753

Ahmed Ould Chbih, Mohamed Ben Faraj Ben Maaouia, M. Sanghare

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引用次数: 0

摘要

本文的主要研究成果有: \\如果$A=\displaystyle{\bigoplus_{n\in\mathbb{Z}}}A_{n}$是一个渐变的双环，$S_{H}$是$A$的正则齐次元素组成的部分，$\overline{S}_{H}$是$S_{H}$生成的$A$的齐次乘闭子集，则: \begin{enumerate}\item 关系 $C_{H}(-) :G_{r}(\overline{S}_{H}^{-1}A-Mod)\longrightarrow COMP(G_{r}(\overline{S}_{H}^{-1}A-Mod))$ 哪个是所有被评分的左边的$\overline{S}_{H}^{-1}A-$模块 $\overline{S}_{H}^{-1}M$ 的 $G_{r}(\overline{S}_{H}^{-1}A-Mod)$我们对应于关联复序列 $(\overline{S}_{H}^{-1}M)_{*}$ 到一个分级 $\overline{S}_{H}^{-1}A-$模块$\overline{S}_{H}^{-1}M$ 对于所有的渐变左态射 $\overline{S}_{H}^{-1}A-$模块$\overline{S}_{H}^{-1}f : \overline{S}_{H}^{-1}M\longrightarrow \overline{S}_{H}^{-1}N$ 程度 $k$对应相应的复链$(\overline{S}_{H}^{-1}f)_{*}^{k}$ 到渐变的左态射 $\overline{S}_{H}^{-1}A-$模块$\overline{S}_{H}^{-1}f : \overline{S}_{H}^{-1}M\longrightarrow \overline{S}_{H}^{-1}N$是一个加性精确协变函子。\item 关系 $(C_{H}\circ\overline{S}_{H}^{-1})(-) :G_{r}(A-Mod)\longrightarrow COMP(G_{r}(\overline{S}_{H}^{-1}A-Mod))$ 哪个是所有被评分的左边的$A-$模块 $M$ 的 $G_{r}(A-Mod)$我们对应于关联复序列 $(C_{H}\circ\overline{S}_{H}^{-1})(M)=(\overline{S}_{H}^{-1}M)_{*}$ 到一个分级 $A-$模块$M$ 对于所有的渐变左态射 $A-$模块$f : M\longrightarrow N$ 程度 $k$对应相应的复链$(C_{H}\circ\overline{S}_{H}^{-1})(f)=(\overline{S}_{H}^{-1}f)_{*}^{k}$ 到渐变的左态射 $A-$模块$f : M\longrightarrow N$是一个加性精确协变函子。 \item \noindent 对于所有$n\in \mathbb{Z}$固定和所有$ M \in G_{r}(A-Mod)$，我们有:$$\overline{S}^{-1}_{H}((H_{n}\circ C)(M))\cong H_{n}(C_{H}\circ \overline{S}^{-1}_{H})(M)).$$\end{enumerate}

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Localization in the Category $COMP(G_{r}(A-Mod))$ of Complex associated to the Category $G_{r}(A-Mod)$ of Graded left $A-$modules over a Graded Ring

The main results of this paper are : \\If $A=\displaystyle{\bigoplus_{n\in\mathbb{Z}}}A_{n}$ is a graded duo-ring, $S_{H}$ is a partformed of regulars homogeneous elements of $A$, $\overline{S}_{H}$ is the homogeneous multiplicativelyclosed subset of $A$generated by $S_{H}$, then: \begin{enumerate}\item The relation $C_{H}(-) :G_{r}(\overline{S}_{H}^{-1}A-Mod)\longrightarrow COMP(G_{r}(\overline{S}_{H}^{-1}A-Mod))$ which that for all graded left$\overline{S}_{H}^{-1}A-$module $\overline{S}_{H}^{-1}M$ of $G_{r}(\overline{S}_{H}^{-1}A-Mod)$we correspond the associate complex sequence $(\overline{S}_{H}^{-1}M)_{*}$ to a graded $\overline{S}_{H}^{-1}A-$module$\overline{S}_{H}^{-1}M$ and for all graded morphism of graded left $\overline{S}_{H}^{-1}A-$modules$\overline{S}_{H}^{-1}f : \overline{S}_{H}^{-1}M\longrightarrow \overline{S}_{H}^{-1}N$ of degree $k$we correspond the associated complex chain$(\overline{S}_{H}^{-1}f)_{*}^{k}$ to a morphism of graded left $\overline{S}_{H}^{-1}A-$module$\overline{S}_{H}^{-1}f : \overline{S}_{H}^{-1}M\longrightarrow \overline{S}_{H}^{-1}N$is an additively exact covariant functor.\item The relation $(C_{H}\circ\overline{S}_{H}^{-1})(-) :G_{r}(A-Mod)\longrightarrow COMP(G_{r}(\overline{S}_{H}^{-1}A-Mod))$ which that for all graded left$A-$module $M$ of $G_{r}(A-Mod)$we correspond the associate complex sequence $(C_{H}\circ\overline{S}_{H}^{-1})(M)=(\overline{S}_{H}^{-1}M)_{*}$ to a graded $A-$module$M$ and for all graded morphism of graded left $A-$modules$f : M\longrightarrow N$ of degree $k$we correspond the associated complex chain$(C_{H}\circ\overline{S}_{H}^{-1})(f)=(\overline{S}_{H}^{-1}f)_{*}^{k}$ to a morphism of graded left $A-$module$f : M\longrightarrow N$is an additively exact covariant functor. \item \noindent For all $n\in \mathbb{Z}$ fixed and for all $ M \in G_{r}(A-Mod)$ we have:$$\overline{S}^{-1}_{H}((H_{n}\circ C)(M))\cong H_{n}(C_{H}\circ \overline{S}^{-1}_{H})(M)).$$\end{enumerate}

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来源期刊

European Journal of Pure and Applied Mathematics MATHEMATICS-

CiteScore

1.30

自引率

28.60%

发文量

156