几乎可裂序列是研究代数表示论的一个有力工具。
The almost split sequence is an important instrument in research of the representation theory for algebra.
并举例说明,对于不一致决策表,其属性约简的代数表示不能用条件信息量来等价表示。
Through examples, it shows that attribute reduction of an inconsistent decision table cannot entirely be represented by conditional information quantity.
最后,得到了若干有益的推论,包括线性离散及连续系统稳定化控制器的统一代数表示等。
Finally, some useful corollaries are obtained which include the algebraic expression of stabilizing controllers for linear continuous and discrete time systems.
代数表示论是上世纪七十年代初兴起的代数学的一个新的分支,它的基本内容是研究环与代数的结构。
Algebra representation theory is a new algebraic branch arising in 1970s whose researches mainly focuses on rings and algebraic structures.
我相信我们缺少另一门分析的学问,它是真正几何的和线性的,它能直接地表示位置,如同代数表示量一样。
G. W. Leibniz I believe that we lack another analysis properly goemetric or linear which expresses location directly as algebra expresses magnitude.
用代数动力学方法求得了用泰勒级数表示的局域收敛的常微分方程的精确解。
By algebraic dynamical method, the exact analytical solutions of the ordinary differential equations are obtained in terms of Taylor series with local convergent radius.
用代数动力学方法求得了用泰勒级数表示的局域收敛的常微分方程的精确解。
By algebraic dynamical method, the exact analytical solutions of the ordinary differential equations are obtained in terms of Taylor series with local convergent radius.
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