- 更多网络例句与代数群相关的网络例句 [注:此内容来源于网络,仅供参考]
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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。
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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。
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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。
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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。
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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。
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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
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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。
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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。
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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。
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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。
- 更多网络解释与代数群相关的网络解释 [注:此内容来源于网络,仅供参考]
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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
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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
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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
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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
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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
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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
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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
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algebraic group:代数群
代数几何[学] algebraic geometry | 代数群 algebraic group | 代数同伦 algebraic homotopy
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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
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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