ON A SPECIAL PRESENTATION OF MATRIX ALGEBRAS

IF 0.5 Q3 MATHEMATICS International Electronic Journal of Algebra Pub Date : 2019-07-11 DOI:10.24330/IEJA.662946
G. Agnarsson, S. Mendelson
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引用次数: 0

Abstract

Recognizing when a ring is a complete matrix ring is of significant importance in algebra. It is well-known folklore that a ring $R$ is a complete $n\times n$ matrix ring, so $R\cong M_{n}(S)$ for some ring $S$, if and only if it contains a set of $n\times n$ matrix units $\{e_{ij}\}_{i,j=1}^n$. A more recent and less known result states that a ring $R$ is a complete $(m+n)\times(m+n)$ matrix ring if and only if, $R$ contains three elements, $a$, $b$, and $f$, satisfying the two relations $af^m+f^nb=1$ and $f^{m+n}=0$. In many instances the two elements $a$ and $b$ can be replaced by appropriate powers $a^i$ and $a^j$ of a single element $a$ respectively. In general very little is known about the structure of the ring $S$. In this article we study in depth the case $m=n=1$ when $R\cong M_2(S)$. More specifically we study the universal algebra over a commutative ring $A$ with elements $x$ and $y$ that satisfy the relations $x^iy+yx^j=1$ and $y^2=0$. We describe completely the structure of these $A$-algebras and their underlying rings when $\gcd(i,j)=1$. Finally we obtain results that fully determine when there are surjections onto $M_2({\mathbb F})$ when ${\mathbb F}$ is a base field ${\mathbb Q}$ or ${\mathbb Z}_p$ for a prime number $p$.
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关于矩阵代数的一个特殊表示
识别环何时是完全矩阵环在代数中具有重要意义。众所周知,一个环$R$是一个完整的$n\timesn$矩阵环,因此对于某个环$S$,$R\cong M_{n}(S)$,当且仅当它包含一组$n\times n$矩阵单元$\{e_{ij}\}_{i,j=1}^n$。最近的一个不太为人所知的结果表明,环$R$是一个完整的$(m+n)\times(m+n)$矩阵环,当且仅当,$R$包含三个元素$A$、$b$和$f$,满足两个关系$af^m+f^nb=1和$f^{m+n}=0。在许多情况下,两个元素$a$和$b$可以分别由单个元素$a$a的适当幂$a^i$和$a^j$代替。一般来说,人们对$S$戒指的结构知之甚少。本文深入研究了$R\cong m_2(S)$时$m=n=1$的情形。更具体地说,我们研究了交换环$a$上的泛代数,其中元素$x$和$y$满足关系$x^iy+yx^j=1$和$y ^2=0$。当$\gcd(i,j)=1$时,我们完全描述了这些$A$-代数的结构及其下环。最后,我们得到了完全确定当${\mathbb F}$是素数$p$的基域${\math BQ}$或${\mah BZ}_p$时,$M_2({\mathBF})$上何时有满射的结果。
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来源期刊
CiteScore
0.90
自引率
16.70%
发文量
36
审稿时长
36 weeks
期刊介绍: The International Electronic Journal of Algebra is published twice a year. IEJA is reviewed by Mathematical Reviews, MathSciNet, Zentralblatt MATH, Current Mathematical Publications. IEJA seeks previously unpublished papers that contain: Module theory Ring theory Group theory Algebras Comodules Corings Coalgebras Representation theory Number theory.
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