不同环的有限GaIois理论之间的GaIois等价性

本文引进了不同的环的Galois理论之间的Galois等价的概念,并证明了任一无限维线性变换完全环在其齐次可分辨子环上的有限Galois理论等价于一有限维线性变换环,亦即满足极小条件的单纯环在其除子环上的有限Galois理论。同时也证明了,在一些特殊情况,无限维线性变换完全环的有限Galois理论等价于除环的有限Galois理论。     

本原环的无限Galois理论

本文首先建立了线性变换环,连续交换环及有非零基座的本原环与单纯Artin环的无限Galois理论是Galois等价的。然后建立了有非零基座的本原环的无限Galois理论。显然,线性变换完全环和连续变换环的无限 Galois理论是其特例。     

关于除环的无限Galois理论(英文)

本文分二部分,第一部分把作者所建立的线性变换完全环之间的有限结构定理扩展到无限的情形。第二部分应用此扩展了的结构定理研究除环上的无限Galois理论。我们的理论包含通常除环上的有限Galois理论。     

On Infinite Galois Theory for Division Rings

本文分二部分，第一部分把作者所建立的线性变换完全环之间的有限结构定理扩展到无限的情形。第二部分应用此扩展了的结构定理研究除环上的无限Galois理论。我们的理论包含通常除环上的有限Galois理论。     

非交换环中的一个Artin引理

本文发展了群Miyashita作用,并在非交换环情形给出域论及Galois理论中Artin引理,即环A作为其中心子环R上的模的生成元个数与Galois群Gal(A/R)的关系。     

Galois环和Z/(m)环上完全非线性函数的性质

本文把完全非线性函数推广到了有限Abel群上,利用特征谱讨论了Z/(m)上Bent函数与GF(pe)上bent函数以及完全非线性函数定义之间的关系;给出Galois环与Z/(m)上最佳线性逼近的特征谱表示,得到完全非线性函数在某种程度上能抵抗最佳线性逼近攻击的结论;并给出一种Galois环与Z/(m)环上完全非线性函数的构结方法.     

置换模,ρ置换模与Conlon比析

本文对特征P的基域F引入适当的Galois群T,讨论p置换模的Green环的Conlon比析在Galois群T作用下的动态,证明了在T作用下p置换模的Green环的不动点集重合于置换模的Green环。     

相对差集和组合集的构造

利用Galois环、Bent函数、Gaolis环上的部分指数和等技巧,构造了指数不超过4的有限交换群上的分裂型相对差集和一类非分裂型组合集.     

线性变换环之间的结构定理及其应用

设F是除环,P是其除子环,而。当有限且P在F中Galois时,许永华教授建立了与之间的结构定理。 本文把它推广到为无限的情况,此时我们得到了如下的结果: 设E′为F的除子环,若K是F的包含的除子环,那末存在,使成立的充要条件是。 由此我们还能建立除环的无限准内(即P在F中Galois,无限,但有限)Galois理论的基本定理。     

GR(4,m)上本原序列最高权位的密码特征

刻划了特征为4的Galois环上本原序列最高权位序列的相关函数、线性度和元素分布等密码特征。     

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.     

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.     

MDS and self-dual codes over rings

In this paper we give the structure of constacyclic codes over formal power series and chain rings. We also present necessary and sufficient conditions on the existence of MDS codes over principal ideal rings. These results allow for the construction of infinite families of MDS self-dual codes over finite chain rings, formal power series and principal ideal rings. We also define the Reed–Solomon codes over principal ideal rings.     

Independence of vectors in codes over rings

We study codes over Frobenius rings. We describe Frobenius rings via an isomorphism to the product of local Frobenius rings and use this decomposition to describe an analog of linear independence. Special attention is given to codes over principal ideal rings and a basis for codes over principal ideal rings is defined. We prove that a basis exists for any code over a principal ideal ring and that any two basis have the same number of vectors. Hongwei Liu is supported by the National Natural Science Foundation of China (10571067).     

Counting codes over rings

We extend the definition of free codes to codes over local rings and arbitrary Frobenius rings. The number of free codes over finite Frobenius rings is determined by calculating the number for local rings and applying the Chinese Remainder Theorem. A formula for the number of codes of arbitrary type over a finite chain ring is given and this is applied to determine the number of linear codes over a finite principal ideal ring.     

Rings Over Which the Class of Gorenstein Flat Modules is Closed Under Extensions

A ring R is called left “GF-closed”, if the class of all Gorenstein flat left R-modules is closed under extensions. The class of left GF-closed rings includes strictly the one of right coherent rings and the one of rings of finite weak dimension.

In this article, we investigate the Gorenstein flat dimension over left GF-closed rings. Namely, we generalize the fact that the class of all Gorenstein flat left modules is projectively resolving over right coherent rings to left GF-closed rings. Also, we generalize the characterization of Gorenstein flat left modules (then of Gorenstein flat dimension of left modules) over right coherent rings to left GF-closed rings. Finally, using direct products of rings, we show how to construct a left GF-closed ring that is neither right coherent nor of finite weak dimension.     

Intermediate rings between matrix rings and Ornstein dual pairs

We show that isomorphism of intermediate rings between row and column finite matrix rings and row finite matrix rings implies Morita equivalence of the coefficient rings and equality of the cardinality of the set of indices. Among the applications we extend the Isomorphism Theorem for Dual Pairs over Division Rings to Ornstein dual pairs over any class of rings for which Morita equivalence implies isomorphism.     

The prüfer rings that are endomorphism rings of artinian modules

In this paper we characterize the (commutative) Priifer rings that can be realized as endomorphism rings of artinian modules over arbitrary associative rings with identity (Theorem 4.7). This characterization is obtained by determining the structure of ∑-pure-injective modules over Prufer rings (Theorems 3.4 and 3.5)     

Noncommutative biorthogonal polynomials

We define and study biorthogonal sequences of polynomials over noncommutative rings, generalizing previous treatments of biorthogonal polynomials over commutative rings and of orthogonal polynomials over noncommutative rings. We extend known recurrence relations for specific cases of biorthogonal polynomials and prove a general version of Favard?s theorem.     

When is Every Module with Essential Socle a Direct Sums of Quasi-Injectives?

In the present article we study the structure of rings, over which essential extensions of semisimple modules are direct sums of quasi-injectives. In the special case of commutative rings, these rings are precisely Artinian PIR and so every module over such rings is a direct sum of cyclics as characterized by Köthe and Cohen-Kaplansky.