中文

Structures and Representations of Generalized Path Algebras

环与代数 2012-01-10 v5 表示论

摘要

It is shown that an algebra Λ\Lambda can be lifted with nilpotent Jacobson radical r=r(Λ)r = r(\Lambda) and has a generalized matrix unit {eii}I\{e_{ii}\}_I with each eˉii\bar e_{ii} in the center of Λˉ=Λ/r\bar \Lambda = \Lambda /r iff Λ\Lambda is isomorphic to a generalized path algebra with weak relations. Representations of the generalized path algebras are given. As a corollary, Λ\Lambda is a finite algebra with non-zero unity element over perfect field kk (e.g. a field with characteristic zero or a finite field) iff Λ\Lambda is isomorphic to a generalized path algebra k(D,Ω,ρ)k (D, \Omega, \rho) of finite directed graph with weak relations and dim {\} \Omega < \infty ; Λ\Lambda is a generalized elementary algebra which can be lifted with nilpotent Jacobson radical and has a complete set of pairwise orthogonal idempotents iff Λ\Lambda is isomorphic to a path algebra with relations.

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引用

@article{arxiv.math/0402188,
  title  = {Structures and Representations of Generalized Path Algebras},
  author = {Shouchuan Zhang and Yao-Zhong Zhang},
  journal= {arXiv preprint arXiv:math/0402188},
  year   = {2012}
}

备注

19 pages. To appear in Algebras and Representation Theory