We introduce nil 3-Armendariz rings, which are generalization of 3-Armendariz rings and nil Armendaiz rings and investigate their properties. We show that a ring R is nil 3-Armendariz ring if and only if for any , Tn(...We introduce nil 3-Armendariz rings, which are generalization of 3-Armendariz rings and nil Armendaiz rings and investigate their properties. We show that a ring R is nil 3-Armendariz ring if and only if for any , Tn(R) is nil 3-Armendariz ring. Also we prove that a right Ore ring R is nil 3-Armendariz if and only if so is Q, where Q is the classical right quotient ring of R. With the help of this result, we can show that a commutative ring R is nil 3-Armendariz if and only if the total quotient ring of R is nil 3-Armendariz.展开更多
In this paper,we introduce the notion of an almost Armendariz ring,which is a generalization of an Armendariz ring,and discuss some of its properties.It has been found that every almost Armendariz ring is weak Armenda...In this paper,we introduce the notion of an almost Armendariz ring,which is a generalization of an Armendariz ring,and discuss some of its properties.It has been found that every almost Armendariz ring is weak Armendariz but the converse is not true.We prove that a ring R is almost Armendariz if and only if R[x]is almost Armendariz.It is also shown th at if R/I is an almost Armendariz ring and I is a semicommutative ideal,then H is an almost Armendariz ring.Moreover,the class of minimal non-commutative almost Armendariz rings is completely determined,up to isomorphism(minimal means having smallest cardinality).展开更多
引入拟正则Armendariz环并研究其性质。证明弱Armendariz环是拟正则Armendariz环,直积∏i∈I R i是拟正则Armendariz环当且仅当每个环R i(i∈I)是拟正则Armendariz环,同时证明R是拟正则Armendariz环当且仅当上三角矩阵环T n(R)(n≥2)是...引入拟正则Armendariz环并研究其性质。证明弱Armendariz环是拟正则Armendariz环,直积∏i∈I R i是拟正则Armendariz环当且仅当每个环R i(i∈I)是拟正则Armendariz环,同时证明R是拟正则Armendariz环当且仅当上三角矩阵环T n(R)(n≥2)是拟正则Armendariz环,并通过例子说明任意环R上的全矩阵环M n(R)(n≥2)不是拟正则Armendariz环。展开更多
引入幂级数J-Armendariz环的概念,进一步扩展幂级数Armendariz环的研究。证明了:(1)设T=(R 0 M S)是一个形式三角矩阵环,则T是幂级数J-Armendariz环当且仅当R和S都是是幂级数J-Armendariz环;(2)设{R_αα∈Λ}是一族环,则直积∏α∈ΛR...引入幂级数J-Armendariz环的概念,进一步扩展幂级数Armendariz环的研究。证明了:(1)设T=(R 0 M S)是一个形式三角矩阵环,则T是幂级数J-Armendariz环当且仅当R和S都是是幂级数J-Armendariz环;(2)设{R_αα∈Λ}是一族环,则直积∏α∈ΛR_α是幂级数J-Armendariz环当且仅当每一个环R_α都是幂级数J-Armendariz环;(3)如果环R是幂级数J-Armendariz环,满足J(R)[x]=J(R[x]),则R[x]是幂级数J-Armendariz环。展开更多
文摘We introduce nil 3-Armendariz rings, which are generalization of 3-Armendariz rings and nil Armendaiz rings and investigate their properties. We show that a ring R is nil 3-Armendariz ring if and only if for any , Tn(R) is nil 3-Armendariz ring. Also we prove that a right Ore ring R is nil 3-Armendariz if and only if so is Q, where Q is the classical right quotient ring of R. With the help of this result, we can show that a commutative ring R is nil 3-Armendariz if and only if the total quotient ring of R is nil 3-Armendariz.
文摘In this paper,we introduce the notion of an almost Armendariz ring,which is a generalization of an Armendariz ring,and discuss some of its properties.It has been found that every almost Armendariz ring is weak Armendariz but the converse is not true.We prove that a ring R is almost Armendariz if and only if R[x]is almost Armendariz.It is also shown th at if R/I is an almost Armendariz ring and I is a semicommutative ideal,then H is an almost Armendariz ring.Moreover,the class of minimal non-commutative almost Armendariz rings is completely determined,up to isomorphism(minimal means having smallest cardinality).
基金This work was supported by the National Natural Science Foundation of China (Grant No. 11071097) and the Natural Science Foundation of Jiangsu Province (BK20141476).
文摘让 M 是 monoid。戒指 R 被称为 M -- Armendariz 如果每当时 =<sub>1</sub > g <sub>1</sub>+<sub>2</sub > g <sub>2</sub>+?? 楮灬瑯湥散 ?? 潈档 ' 諛 E 摬 ? 潣潨潭潬祧吗??
文摘引入幂级数J-Armendariz环的概念,进一步扩展幂级数Armendariz环的研究。证明了:(1)设T=(R 0 M S)是一个形式三角矩阵环,则T是幂级数J-Armendariz环当且仅当R和S都是是幂级数J-Armendariz环;(2)设{R_αα∈Λ}是一族环,则直积∏α∈ΛR_α是幂级数J-Armendariz环当且仅当每一个环R_α都是幂级数J-Armendariz环;(3)如果环R是幂级数J-Armendariz环,满足J(R)[x]=J(R[x]),则R[x]是幂级数J-Armendariz环。
基金The National Natural Science Foundation of China (No.10571026)the Specialized Research Fund for the Doctoral Program of Higher Education of China (No.20060286006)