- 更多网络例句与代数数论相关的网络例句 [注:此内容来源于网络,仅供参考]
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It has developed from two sources: algebraic geometry and algebraic member theory.
它由两个方面发展而来,代数几何和代数数论。
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As an important algebraic subject, rings are the base on Algebraic Geometry and Algebraic Number Theory.
环作为一门重要的代数学科是代数几何和代数数论的基础,有许多其它相关学科领域都涉及到环。
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Computing integral closure of a finite extension is not only an important problem in commutative algebra, but also in algebraic geometry and algebraic number theory.
计算有限扩张的整闭包不但是交换代数中的一个核心问题,也很受代数几何以及代数数论发展的推动。
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Prime ideal decomposition is an important problem in algebraic number theory and is relative closely with the class field theory and so on.
素理想分解问题是代数数论中的一个重要课题,它与类域论的关系极为密切,因而如何判断K的素理想在K的有限扩张中的分解状况是一个十分有意义的问题。
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The main work of this paper is to disscuss these Diophantine equations with the congruent method and the Algebraic Number Theory.
本论文主要利用简单同余法和代数数论方法讨论了以下不定方程:一。
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It contained ideas of his teacher, Artin; some of the most interesting passages in Algebraic Number Theory also reflect Artin's influence and ideas that might otherwise not have been published in that or any form.
朗在数论研究方面吸纳了他的导师阿金的一些思想,甚至在他的一些还未发表的代数数论文章当中所蕴含的思想也能感受到阿。金对朗的影响。
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It is rich in content, and algebraic number theory, geometry number theory, number theory, etc. have set more closely linked .
不定方程的内容十分丰富,与代数数论、几何数论、集合数论等等都有较为密切的联系。
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According to algebraic number theory,all solutions of Pocklington equation in a ring of integers of a quadratic imaginary field are determined,which implies that the equation has only several solutions in the ring.
利用代数数论的理论与方法,决定了一个重要的不定方程在一个特殊的虚二次域整数环中的解,从而指出这个方程在比整数环更大的环中也仅有有限个解。
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Algebraic K-theory is an important branch of algebra which has deep relationships with other branches of mathematics such as algebraic number theory, algebraic geometry and algebraic topology.
代数K-理论是代数学的一个重要分支,它与数学中代数数论,代数几何和代数拓扑等其它分支有深刻的联系。
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By reviewing carefully original literature,it is pointed out that pursing a more general reciprocity law maby the most motive of the development of algebraic number theory, usual material mainly emphasizes the function of Fermats last theorem.
通过原始文献的深入分析,研究表明:一般互反定律的寻求可能是代数数论发展的最主要动力,而通常文献中主要强调了费马大定理的作用。
- 更多网络解释与代数数论相关的网络解释 [注:此内容来源于网络,仅供参考]
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algebraic function theory:代数函数论
algebraic function element | 代数函数元素 | algebraic function theory | 代数函数论 | algebraic geometry | 代数几何(学)
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algebraic function element:代数函数元素
algebraic fraction | 代数分式, 代数分数 | algebraic function element | 代数函数元素 | algebraic function theory | 代数函数论
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algebraic number field:代数数域
algebraic number 代数数 | algebraic number field 代数数域 | algebraic number theory 代数数论
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algebraic number field:代数数体
代数数 algebraic number | 代数数体 algebraic number field | 代数数论 algebraic number theory
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algebraic number theory:代数数论
代数数体 algebraic number field | 代数数论 algebraic number theory | 代数运算 algebraic operation
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arithmetic of algebraic number fields:代数数域的数论
arithmetic number 正实数 | arithmetic of algebraic number fields 代数数域的数论 | arithmetic of algebras 代数的数论
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arithmetic of algebras:代数的数论
arithmetic of algebraic number fields 代数数域的数论 | arithmetic of algebras 代数的数论 | arithmetic of local fields 局部域的数沦
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class field theory:类域论
代数数论 引申代数数的话题,关于代数整数的研究,主要的研究目标是为了更一般地解决不定方程的问题,而为了达到此目的,这个领域与代数几何之间有相当关联, 比如类域论(class field theory) 就是此间的颠峰之作..
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commutative ring:交换环
特别是代数几何与代数数论(交换环)、泛函分析(交换赋范环、算子环与函数环)飞拓扑(拓扑空间上的连续函数环).域论、交换环理沦(见域(阮ld),交换环(commutative ring),亦见交换代数(commutative al罗bra)),
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theory of algebraic equations:代数方程式论
12121,"theory of algebra","代数论" | 12122,"theory of algebraic equations","代数方程式论" | 12123,"theory of algebraic invariants","代数不变式论"