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
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)