代数群

Arad and Blau proved that an abelian table algebra can be viewed as a group algebra of some abelian group G. Chapter 3 of this paper gives the structural theorem of abelian table algebras by defining a group structure in table basis. Furthermore, the structure of elementary abelian table algebras is discussed using the number of composition series of table algebras.

Arad和Blau证明了abel表代数等价于某个有限生成abel群G的群代数，受此启发本文第3节通过定义表基的一个群结构给出了abel表代数的结构定理，并从合成列数目的角度对初等abel表代数进行了细致刻画。

Aiming at OQL, we treated type as monoid (collection monoid and primitive monoid), and used monoid comprehension as OQL's intermediate representation. Therefore we can merge the rewrite rules for a number of collection types, then employ monoid comprehension in defining algebraic operators, as cut out the limit that in relational algebra/calculus algebraic operators are only for set.

针对ODMG-2.0的对象查询语言OQL，我们把类型提高到幺群级，然后从幺群概括入手，用幺群概括作为OQL的查询中间表示，统一了多种聚集类型的重写规则，幺群概括还被我们用于定义代数操作符，这使得代数操作符突破了关系代数/演算中只针对集合的局限。

Within the round function, the logistic chaotic map and three algebraic group operations are mixed.

在轮函数巾用Logistic混沌映射和3个代数群算子进行混合运算，此外还特别设计了子密钥生成算法。

Within the round function, the logistic chaotic map and three algebraic group operations are mixed. Moreover, the subkeys schedule is specially designed for the consideration of the security.

在轮函数中用Logistic混沌映射和3个代数群算子进行混合运算，此外还特别设计了子密钥生成算法。

We obtain that if any 〓 is discrete or elementaryand 〓 satisfies Condition A,then the algebraic limit G of group sequence 〓is discrete or elementary.

首先，我们不再仅仅考虑离散非初等群集〓的代数极限G，而是离散群或初等群群集〓的代数极限G，我们对〓上〓变换群中斜驶元及其不动点进行了细致研究，注意到任意一个斜驶元存在一个仅仅含有斜驶元的领域，从而证明了初等群群集〓的代数极限G仍然是初等群，进而我们得到了一个代数收敛定理：如果任一〓是离散群或者初等群并且〓满足条件A，那么，群列〓的代数极限G一定是离散群或者初等群。

Buildings and Classical Groups provides essential background material for specialists in several fields, particularly mathematicians interested in automorphic forms, representation theory, p-adic groups, number theory, algebraic groups, and Lie theory.

建筑物和古典组在多个领域提供必要的背景材料的专家，尤其是数学家在自守形式，表象理论，p进组，数论，代数群感兴趣，李theor

Explicitly, they are consist of three classes: If H is semisimple, then H k* for some finite group; If H is not semisimple and the characteristic of k is zero, then H is isomorphic the dual of the cross product between one so called Andruskiewitsch-Schneider algebra and a group algebra; If H is not semisimple and the characteristic of k is not zero, then H is isomorphic the dual of the cross product between one special algebra and a group algebra.

具体地讲，它们共分三类：①如果H是半单的，则H同构与一个群代数的对偶；②如果H是非半单的并且基础域的特征是0的话，则H同构一个所谓Andruskiewitsch-Schneider代数与一个群代数交差积的对偶；③如果H是非半单的并且基础域的特征不是0的话，则H同构于某个特定代数与一个群代数交差积的对偶。

In the future network and information age,it can be expected that Error-Correcting Code will gain its widerap placation,and the research and develop work of it will have high practicalv alue and profound meaning.

本文在介绍近世代数群、环、域等概念的数学基础上，学习并总结了纠错码译码算法的发展和现状。

Prof. Hsio-Fu Tuan,a member of Academia Sinica and eminent mathematician in China, has made outstanding contributions in the theory of modular representations of finite groups, algebraic Lie algebras and the study of p-groups,especially their "Anzanl" theorems.

从30年代末开始，他在有限P群、有限群模表示论和代数李代数方面做出了一系列重要贡献，得到了被冠以布饶尔－段－斯坦顿原则，布饶尔－段指标块分离原则，布饶尔－段定理等名称的突出成就，在中国开辟了代数群论等研究领域并形成了富有特色的研究群体。

Explicitly, they are consist of three classes: If H is semisimple, then H k* for some finite group; If H is not semisimple and the characteristic of k is zero, then H is isomorphic the dual of the cross product between one so called Andruskiewitsch-Schneider algebra and a group algebra; If H is not semisimple and the characteristic of k is not zero, then H is isomorphic the dual of the cross product between one special algebra and a group algebra.

具体地讲，它们共(来源：5fbfA02BC论文网www.abclunwen.com)分三类：①如果H是半单的，则H同构与一个群代数的对偶；②如果H是非半单的并且基础域的特征是0的话，则H同构一个所谓Andruskiewitsch-Schneider代数与一个群代数交差积的对偶；③如果H是非半单的并且基础域的特征不是0的话，则H同构于某个特定代数与一个群代数交差积的对偶。

absolutely simple algebraic group：绝对单代数群

absolutely simple algebra | 绝对单代数 | absolutely simple algebraic group | 绝对单代数群 | absolutely summable sequence | 绝对可和序列

affine algebraic group：仿射代数群

仿射簇的维数|dimension of an affine variety | 仿射代数群|affine algebraic group | 仿射等价|affine congruence, affine equivalence

connected affine algebraic group：连通的仿射代数群

connect | 连接, 联合, 关连 | connected affine algebraic group | 连通的仿射代数群 | connected category | 连通范畴

Hopf Algebra , Algebraic Group and Qua ntum：代数与代数群量子群

代数几何 Algebraic Geometry | Hopf代数与代数群量子群 Hopf Algebra , Algebraic Group and Qua ntum | 量子群表示 Representation of Quantum Groups

Hopf Algebra , Algebraic Group and Quantum Group：代数与代数群量子群

代数几何 Algebraic Geometry | Hopf代数与代数群量子群 Hopf Algebra , Algebraic Group and Quantum Group | 量子群表示 Representation of Quantum Groups

Hopf Algebra , Algebraic Group and Qua ntumGroup：代数与代数群量子群

代数几何 Algebraic Geometry | Hopf代数与代数群量子群 Hopf Algebra , Algebraic Group and Qua ntumGroup | 量子群表示 Representation of Quantum Groups

Hopf Algebra , Algebraic Group and Qua ntum Group：代数与代数群量子群

代数几何 Algebraic Geometry | Hopf代数与代数群量子群 Hopf Algebra , Algebraic Group and Qua ntum Group | 量子群表示 Representation of Quantum Groups

algebraic group：代数群

代数几何[学] algebraic geometry | 代数群 algebraic group | 代数同伦 algebraic homotopy

linear algebraic group：线性代数群

线性代数|linear algebra | 线性代数群|linear algebraic group | 线性等价|linearly equivalence

character of algebraic group：代数群的特征[标]

代数群的李代数|Lie algebra of an algebraic group | 代数群的特征[标]|character of algebraic group | 代数群的外尔群|Weyl group of algebraic group