摘要
介绍了李color代数的T*-扩张的定义,并证明李color代数的很多性质,如幂零性、可解性和可分解性,都可以提升到它的T*-扩张上.还证明在特征不等于2的代数闭域上,有限维幂零二次李color代数A等距同构于一个幂零李color代数B的T*-扩张,并且B的幂零长度不超过A的一半.此外,用上同调的方法研究了李color代数的T*-扩张的等价类.
In this paper, the notion of T^*-extension of a Lie color algebra is introduced. Many properties of a Lie color algebra can be lifted to its T^*-extensions, such as nilpotency, solvability and decomposition. It is proved that every finite-dimensional nilpotent quadratic Lie color algebra A over an algebraically closed field of characteristic different from 2 is isometric to a T^*-extension of a nilpotent Lie color algebra B, and the nilpotent length of B is at most half of that of A. Moreoverl the equivalence of T^*-extensions is investigated from the cohomological point of view.
出处
《数学年刊(A辑)》
CSCD
北大核心
2014年第5期623-638,共16页
Chinese Annals of Mathematics
基金
国家自然科学基金(No.11171055
No.11471090
No.11226054)
中央高校基本科研业务费专项资金(No.12SSXT139)
教育部留学回国人员科研启动基金
吉林省自然科学基金(No.201115006)的资助
