和音
发表于 2025-3-25 07:21:01
http://reply.papertrans.cn/17/1636/163507/163507_21.png
母猪
发表于 2025-3-25 10:19:25
http://reply.papertrans.cn/17/1636/163507/163507_22.png
sparse
发表于 2025-3-25 15:26:07
https://doi.org/10.1007/978-3-319-92612-4truction is unique by the Krull—Schmidt Theorem. The next step toward understanding .-modules is therefore in the direction of indecomposable modules, and this topic is currently the center of vigorous activity in ring theory. The aim of this chapter and the next chapter is to introduce the reader t
OVERT
发表于 2025-3-25 19:48:01
Matthew Alan Le Brun,Ornela DardhaP. Gabriel. He gave an explicit construction of the indecomposable modules for certain finite dimensional .-algebras. The most surprising part of Gabriel’s result is a link between the representation theory of algebras and the Dynkin diagrams that occur in the study of semisimple Lie algebras. This
moratorium
发表于 2025-3-25 21:06:30
Valentina Castiglioni,Adrian Francalanzar .-algebras, separability is more restrictive than semisimplicity. One purpose of this chapter is to give an effective characterization of separable algebras over fields. In the course of obtaining this characterization, we will establish some properties of separable algebras that are important eve
In-Situ
发表于 2025-3-26 03:00:18
Lecture Notes in Computer Sciencey of algebras is introduced. The reader is warned that the ratio of definitions to theorems in the first five sections of the chapter is very high. However, the cohomology of associative algebras plays an important part in the study of central simple algebras, as we will see in Chapter 14. In this c
甜得发腻
发表于 2025-3-26 06:02:09
Lecture Notes in Computer Science The problems encountered in the study of infinite dimensional simple algebras are formidable; they lead to a theory that bears little resemblance to the subject of finite dimensional, simple algebras.
分开
发表于 2025-3-26 10:44:54
http://reply.papertrans.cn/17/1636/163507/163507_28.png
Allodynia
发表于 2025-3-26 12:38:59
Petra van den Bos,Marielle Stoelinga compute .(.) for any field .. The key results in this program are: (1) .(.) = ∪.(.), where the union is taken over all Galois extensions .(Corollary 13.5); (2) .(.)≅ H.(.(.|.),E°) the second cohomology group of .° considered as a Z.(.)-bimodule in a suitable way (Theorem 14.2); (3) the isomorphism
Cardioversion
发表于 2025-3-26 19:29:42
http://reply.papertrans.cn/17/1636/163507/163507_30.png