| 1. | Analytically modeling of complicated boundary simply - connected region conformal mapping
复杂边界单连通域共形映射解析建模研究 |
| 2. | Only one kind of representation - infinite algebras was . discussed in the paper
本文仅对于无限表示型单连通代数的一种进行了讨论。 |
| 3. | The relationship of simple connectedness and 1 hochschild cohomology group is very clear for representation - finite algebras
单连通性和一次hochschild上同调群之间的联系,在有限表示型的情形已经很清楚了。 |
| 4. | In this example , the surface is not simply connected and any smoothed - out object looks like a torus with at least one hole
在这个例子里,圈饼表面就是非单连通的,并且这类物体的简化就会像是至少有一个洞的曲面。 |
| 5. | In the first part of this thesis , we discuss the challenges of the water simulation scenes and give a detailed survey of this subject
因此在我们的模型下,水域不再限制成矩形类的区域,而可以是任意单连通的区域。 |
| 6. | In this paper , the stability and multiplicity of closed geodesics are considered on some compact simply connected manifolds with the eohomology algebra td , n ( x ) of truncated polynomial algebra
本文研究一类单连通紧流形上的闭测地线的多重性与稳定性,这类流形具有截断多项式代数作为其同调代数 |
| 7. | The notion of fundamental group also came from topology . there are close relations with simple connectedness in representation theory of algebras for fundamental group , as was in algebraic topology
基本群的概念同样来自拓扑学,同它在代数拓扑中一样,它在表示论中与单连通性也有密切的联系。 |
| 8. | Lower degree hochschild cohomology group have a very concrete interpretation of classic algebraic structure , especially , there are inner connection between 1 hochschild cohomology group and simply connected algebra
低次的hochschild上同调群对于典型的代数的结构有具体的解释,尤其是一次的hochschild上同调群与单连通代数有着内在的联系。 |
| 9. | The notion of simple connectedness came from topology , and the corresponding ones also appear in some subjects such as analysis . it was given new meaning when introduced in the representation theory . there are close relations between the simple connectedness of finite - dimensional algebras and the covering theory
单连通的概念来源于拓扑学,此外在分析等学科中也有相应的概念,引入表示论中后又被赋予新的意义。 |
| 10. | Simply connected algebra of representation - finite have been thoroughly studied , since bongartz and gabrie studied it . but the knowledge of simply connected algebra with representation - infinite type is very poor , only some special class of it was carefully invesitigated
有限维代数的单连通性与覆盖理论的关系十分密切,自bongartz和gabriel开始对有限表示型单连通代数研究以来,单连通代数在有限表示型的情形得到了彻底的讨论。 |
