1) regular with an identity
含幺正则环
2) unit π-regular ring
幺π-正则环
1.
Moreover,we show that: If R is a left G-morphic ring,the same is true of eRe for every idempotent e∈R;Every unit π-regular ring is a left(right) G-morphic ring;Every left G-morphic ring is a right GP-injective ring.
我们给出了G-morphic环的定义,证明了如下主要结果:对R中的任意幂等元e,如果R是左G-morphic环,则eRe也是左G-morphic环;每一个幺π-正则环是左(右)G-morphic环;每一个左G-morphic环是右GP-内射环。
3) ring with identity
含幺环
1.
We generalize the rank of matrices over a division ring to the B-rank of matrices over a ring with identity and study properties for the B-rank of matrices over a ring with identity.
我们将体上矩阵的秩推广为含幺环上矩阵的B-秩,并研究了含幺环上矩阵的B—秩的性质。
5) commutative ring
含幺交换环
1.
Then we guess that derivation of intermediate matix ring over a commutative ring could be ex- pressed as summation of any standard derivations.
定出了含幺交换环上一类矩阵环的标准导子;并猜想任何这类矩阵的导子均可以表示成若干标准导子的和。
2.
In this article,the derivation of P over a commutative ring is expressed as summation of any standard derivations by making P an intermediate matrix ring between diagonal matrix ring and upper triangular matrix ring.
在含幺交换环上,将介于对角阵环和上三角矩阵环的中间矩阵环的导子表示成了标准导子的和。
6) regular monoids
VonNeumann正则幺半群
补充资料:正则环
正则环
*-regular ring
‘正则环卜一佣.山r对l招;一pe口朋钾Oe劝则。J 带有对合反自同构俐~“*的正则环(仰Nh助-姗愈义下的)(比州肚nllg(谊the别级侣e ofvon卜犯u-~”,使得戊扩=0蕴涵“二0二正则环的幂等元。称为一个投影算子(p咧戊tor),若。*二。.,正则环的每个左(右)理想由唯一的投影算子生成.这样可以谈到·正则环的投影算子的格.若格是完全的,则是一个连续几何(contjnuous罗。能好).一个有齐次基“t,…,a。(。)4)的有补模格(m团过肚妞-石ce)(亦见有补格(】atti优俪伍comPlemet出))是有正交补的格,当且仅当它同构于某个,正则环的投影算子的格.
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条