Nil 3-Armendariz Rings

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.

Nilpotent Elements and Nil-Reflexive Property of Generalized Power Series Rings

Let R be a ring and (S,≤) a strictly ordered monoid. In this paper, we deal with a new approach to reflexive property for rings by using nilpotent elements, in this direction we introduce the notions of generalized power series reflexive and nil generalized power series reflexive, respectively. We obtain various necessary or sufficient conditions for a ring to be generalized power series reflexive and nil generalized power series reflexive. Examples are given to show that, nil generalized power series reflexive need not be generalized power series reflexive and vice versa, and nil generalized power series reflexive but not semicommutative are presented. We proved that, if R is a left APP-ring, then R is generalized power series reflexive, and R is nil generalized power series reflexive if and only if R/I is nil generalized power series reflexive. Moreover, we investigate ring extensions which have roles in ring theory.

nil-α-相容环

给出nil-α-相容环的定义,讨论nil-α-相容环与相关环之间的关系.研究nil-α-相容环的相关性质和基本扩张.特别地,推广已有的相关结论.

斜诣零Armendariz环

本文研究了α-诣零Armendariz环的性质.利用环R上的斜多项式环,得到了α-诣零Armendariz环的例子并研究了它的扩张,推广了文献[4]中关于诣零Armendariz环的相应的结论.

强诣零Armendariz环

结合环R称为强诣零Armendariz的如果对于R[x]中任意两个多项式f(x),g(x)当f(x)g(x)∈Nil*(R)[x]时,有ab∈Nil*(R),这里a,b分别是f(x),g(x)的任何系数,而N*(R)为R的素根。证明了强诣零Armendariz环R的素根与上诣零根一致;强诣零Armendariz环是诣零Armendariz环;证明了R是强诣零Armendariz环当且仅当R的每个子环是强诣零Armendariz环,当且仅当R的多项式环R[x]是强诣零Armendariz环,当且仅当R的上三角矩阵环Tn(R)是强诣零Armendariz环;R是强诣零Armendariz环当且仅当R/Nil*(R)是Armendariz环。并推广了弱Armendariz环的两个结果。

关于诣零Armendariz环的一点注记

设I是环R的理想,并且R/I是诣零Armendariz环.本文给出了环R是诣零Armendariz环的几个充分条件.此外,我们还讨论了环R和R[x]中的弱零化子之间的关系,给出了R是诣零Ar-mendariz环的一些等价条件.

nil-α-相容环的一点注记

研究了nil-α-相容环的相关性质和基本扩张.给出了满足条件(P)的nil-Armendariz环的一些结论.特别地,推广了已有的相关结论.

N-弱拟Armendariz环

本文研究了N-弱拟Armendariz环的基本性质以及与一些特殊环的关系.利用某些矩阵环的特殊性质,得到了环R是N-弱拟Armendariz环当且仅当环T_n(R)是N-弱拟Armendariz环,推广了弱拟-Armendariz环的相应结果.

微分多项式环的半交换性和对称性

研究微分多项式环R[x;δ]和Ore扩张环R[x;α,δ]的广义半交换性质和广义对称性质,使用逐项分析方法证明了:设R是δ-Armendariz环,则R[x;δ]是诣零半交换环(弱半交换环、广义弱对称环、弱zip环、右弱McCoy环)当且仅当R是诣零半交换环(弱半交换环、广义弱对称环、弱zip环、右弱McCoy环);设R是弱2-素环和(α,δ)-条件环,则R[x;α,δ]是诣零半交换环(分别地,弱半交换环,广义弱对称环).

广义半交换环的一点注记

讨论了弱α-半交换环与nil-半交换环的关系.证明了在nil-半交换条件下,弱α-半交换环与α-skew π-Armendariz环的关系.推广了(α-)半交换环与弱α-skew Armendariz环的相关结论.

广义诣零α-斜Armendariz环

引入了广义诣零α-斜Armendariz环的概念,得到了广义诣零α-斜Armendariz环的基本性质与刻画。

α-斜拟诣零Armendariz环

引入了α-斜拟诣零Armendariz环的概念,研究了α-斜拟诣零Armendariz环的基本性质,给出了α-斜拟诣零Armendariz环的等价刻画。