整环上广义幂级数环的分解性质

设A■B是整环的扩张, (S,≤)是满足一定条件的严格偏序幺半群, [[BS,≤]]是整环B上的广义幂级数环.本文研究整环[[BS,≤]]和{f∈[[BS,≤]]|f(0)∈A}的ACCP条件和BFD性质. 结果表明,整环{f∈[[BS,≤]]|f(0)∈A}的分解性质不仅依赖于A和B的分解性质以及U(A)和U(B),而且还依赖于幺半群S的分解性质.该结果能够构造出具有某种分解性质的整环的新例子.     

整环上广义幂级数环的分解性质

设A(て)B是整环的扩张,(S,≤)是满足一定条件的严格偏序幺半群,[[BS,≤]]是整环B上的广义幂级数环.本文研究整环[Bs,≤]]和{f∈[[Bs,≤]]|f(0)∈A}的ACCP条件和BFD性质.结果表明,整环{f∈[[BS,≤]]|f(0)∈A}的分解性质不仅依赖于A和B的分解性质以及U(A)和U(B),而且还依赖于幺半群S的分解性质.该结果能够构造出具有某种分解性质的整环的新例子.     

广义幂级数环的拟Baer性

设R是环,(S,≤)是严格全序幺半群,且对任意s∈S都有0≤s.本文证明了环R是拟Baer环当且仅当R上的广义幂级数环[RS,≤]]是拟Baer环。     

广义幂级数环的拟Baer性

设R是环,（S,≤）是严格全序幺半群,且对任意s∈S都有0≤s.本文证明了环R是拟Baer环当且仅当R上的广义幂级数环[[RS,≤]]是拟 Baer环.     

SELF-DUAL PERMUTATION CODES OVER FORMAL POWER SERIES RINGS AND FINITE PRINCIPAL IDEAL RINGS

In this paper, we study self-dual permutation codes over formal power series rings and finite principal ideal rings. We first give some results on the torsion codes associated with the linear codes over formal power series rings. These results allow for obtaining some conditions for non-existence of self-dual permutation codes over formal power series rings. Finally, we describe self-dual permutation codes over finite principal ideal rings by examining permutation codes over their component chain rings.     

广义幂级数环的本质理想和非奇异性

本文研究了广义幂级数环与其系数环在本质理想和非奇异性上的关系.利用本质理想的定义和性质,得到了广义幂级数环的左理想为本质左理想的菪干充分必要条件.在此基础上,给出了广义幂级数环为左非奇异环的充分必要条件.     

CYCLIC CODES OVER FORMAL POWER SERIES RINGS

In this article, cyclic codes and negacyclic codes over formal power series rings are studied. The structure of cyclic codes over this class of rings is given, and the relationship between these codes and cyclic codes over finite chain rings is obtained. Using an isomorphism between cyclic and negacyclic codes over formal power series rings, the structure of negacyclic codes over the formal power series rings is obtained.     

ARMENDARIZ RINGS AND SEMICOMMUTATIVE RINGS

Abstract

If a sum of univariate polynomials is zero, then there are restrictions on the multiplicities of zeros of the polynomials.     

GENERALIZED POWER SERIES MODULES

In this paper we obtain results pertaining to noetherian nature of generalised power series modules over rings not necessarily possessing an indentity element. These considerably strengthen earlier results of Ribenboim on this topic.     

MULTIVARIATE FOURIER SERIES OVER A CLASS OF NON TENSOR－PRODUCT PARTITION DOMAINS

This paper finds a way to extend the well-known Fourier methods,to so-called n 1 directions partition domains in n-dimension.In particular,in 2-D and 3-D cases,we study Fourier methods over 3-direction parallel hexagon partitions and 4-direction parallel paralleogram dodecahedron partitions,respectively.It has pointed that,the most concepts and results of Fourier methods on tensor-product case,such as periodicity,orthogonality of Fourier basis system,Partial sum of Fourier series and its approximation behavior,can be moved on the new non tensor-product partiton case.     

REMARKS ON QUASI-PERFECT RINGS AND FC-RINGS

设Ｒ是有单位元的环，Ｓ是Ｒ的几乎优越扩张，Ｇ是有限群且｜Ｇ｜－１∈Ｒ．证明了Ｒ是ＦＣ－环（拟完备环，凝聚环）当且仅当Ｓ是ＦＣ－环（拟完备环，凝聚环），也当且仅当Ｓｍａｃｈ积Ｒ＃Ｇ＊是ＦＣ－环（拟完备环，凝聚环）．     

gr－正则环和矩阵环的gr－正则性

本文主要证明了（１）当Ｇ是有限群时，Ｇ－型分次环Ｒ是ｇｒ－正则的当且仅当ＲＧ是正则的当且仅当Ｍ＿Ｇ（Ｒ）是ｇｒ－正则的当且仅当对每个和Ｇ的任意非空子集Ｈ和Ｆ，Ｍ＿（ＨＸＦ）（Ｒ）的每个矩阵都有１－逆。（２）当Ｇ是任意群，Ｇ－型分次环只是反ｇｒ－正则的当且仅当Ｆ是反正则的当且仅当对每个和Ｇ的任意作非空子集Ｈ和Ｋ，ＦＭ＿（Ｈ×Ｆ）（Ｒ）的每个矩阵有２－逆当且仅当ＦＭ＿Ｇ（Ｒ）是ｇｒ－反正则的。     

拟共形映射和John域

本文研究了(R)∫ΩBn中的John域与一致域和线性局部连通域的关系.利用平面中John域和拟圆的关系,获得了(R)∫ΩBn中的John域成为一致域和线性局部连通域的几个充分条件,它们是(R)2的推广.     

LUV环及其群环上的模

本文证明了正则ＬＵＶ环是有限个唯一分解整环的直和，并进而讨论了ＬＵＶ环上群环上的模。     

球偏差域和拟球

研究了空间球偏差域和拟球,证明了拟球一定量球偏差域,给出了球偏差域的一个充分必要条件。     

Dirichlet级数与连带级数

本文研究了右半平面内解析的Dirichlet级数的增长性,利用凸函数和一致收敛数的性质和几个引理,证明了连带级数的奇异点与原级数的增长性有关,并得到该连带级数的一些性质.     

PRINCIPAL IDEAL DOMAINS AND EUCLIDEAN DOMAINS HAVING 1 AS THE ONLY UNIT

We consider a question raised by Mowaffaq Hajja about the structure of a principal ideal domain R having the property that 1 is the only unit of R. We also examine this unit condition for the case where R is a Euclidean domain. We prove that a finitely generated Euclidean domain having 1 as its only unit is isomorphic to the field with two elements F ₂ or to the polynomial ring F ₂[X]. On the other hand, we establish existence of finitely generated principal ideal domains R such that 1 is the only unit of R and R is not isomorphic to F ₂ or to F ₂[X]. We also construct principal ideal domains R of infinite transcendence degree over F ₂ with the property that 1 is the only unit of R.