1) path coalgebra
路余代数
1.
In this paper,graph properties of simple undirected Hopf quivers and the relation between path algebras and path coalgebras are discussed.
本文研究了简单无向Hopf箭图的图论性质以及路代数与路余代数的关系。
2.
In this paper, the quantum algebra Uq(sl2) as well as the superalgebra Uq(osp(2, 1)) are realized by the quotient of algebra on double path coalgebra ■.
在q不为单位根时,本文用无限简图A∞∞的double路余代数■的商代数同时实现了量子代数Uq(sl2)以及量子超代数Uq(ops(2,1))。
3.
This paper is devoted to studying the path coalgebra from the view of locally finite category ,the representation of Q, the comodule over the path coal.
本文致力于从局部余模,有限范畴的角度研究路余代数P(C)=KQ~c(以下简称P(C)),其上的余模和Q的表示。
2) path coalgebras
路余代数
1.
According to the properties of path coalgebras,using the definition and methods of calculating Hochschild cohomology given by Doi Y,as well as the researching methods of Hochschild cohomology in algebras,we study the coradicals of path coalgebras,the Hochschild cohomology of path coalgebras and quotient coalgebras of path coalgebras.
根据路余代数的性质,利用Hochschild上同调的定义与计算方法,借鉴代数中的Hochschild上同调的研究方法,研究了路余代数的余根、路余代数及路余代数的商余代数的Hochschild上同调。
2.
In the third chapter, we study a special pointed coalgebras-path coalgebras.
本文第三章研究了一类特殊的Pointed余代数-路余代数。
3) Co-path Hopf algebra
余路Hoof-代数
4) generalized path coalgebra
广义路余代数
1.
We firstly introduce the concept of generalized path coalgebra through assigning a k-coalgebra to each vertex of a given quiver.
通过将箭图的每个顶点放置一个k-余代数,首先引进了广义路余代数的概念,其次给出了广义路余代数的一些基本性质,还讨论了同构问题。
5) comodule coalgebra
余模余代数
1.
This paper introduces the conception of two-sided Hopf comodule coalgebras and mainly gives the Maschke theorem for two-sided H-comodule coalgebra.
引入了双边Hopf余模余代数概念,并证明了双边Hopf余模余代数的Maschke定理。
6) coalgebra
[kəu'ældʒibrə]
余代数
1.
Generalized Coassociative Law for Coalgebras and Comodules;
余代数和余模的广义余结合律
2.
Quasi-conoetherian Coalgebras;
拟余Noether余代数(英文)
补充资料:代数余子式
代数余子式
(algebraic) cofoctor
代数余子式【(algebraic)即血d匕r;呱响卿洲心搜助uo几.日川.],子式(minor)M的 数 (一l丫十‘detA了卜老,这里M为某n阶方阵A的带有行i,,…,几与列j,,一人的k阶子式;detA式’君是从A划去M的所有行与列后得到的n一k阶矩阵的行列式;s二i,十…十i*,‘习、十…十人·下述La禅aCe窄浮(L aPlaCe‘heorem)成立:如果在一个”阶行列式中任意固定r行,则对应于这些固定行的所有r阶子式与它们的代数余子式的乘积的和等于这个行列式的值.晰注】此LaPlaCe定理通常称为行烈莽的LaPla“尽开(加Pla.develoPment of a determinant).
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