摘要
在迹极限的意义下,特别是在单代数的条件下,研究某些C^*-代数性质的封闭性,假设A=(t2)lim n→∞(An,pn),An上至少有一个迹态或An具有(SP)性质,则A也有相同的结果;假设A=(t3)lim n→∞(An,pn)并且A中单代数,如果TR(An)=0,tsr(An)=1和An具有投影消去律,则A也有相同的结果。
It was shown that there are some C^*-algebras maintaining the closing property with the tracial limit, especially under the condition of simplicity. Suppose A = (t2) lim n→∞ (An,pn). If each An admits at least one tracial state or has SP-property, then A has the same case. Suppose A = (t3)lim n→∞(An,pn) and A is simple. If TR(An) = 0, tsr(An) = 1 and An has Cancelation of Projection, then A has the same case.
出处
《华东师范大学学报(自然科学版)》
CAS
CSCD
北大核心
2006年第3期8-14,共7页
Journal of East China Normal University(Natural Science)
基金
国家自然科学基金项目(10271090)
上海市重点学科建设项目
上海工程技术大学青年科学基金(2005Q25)
关键词
迹极限
C^*-代数
封闭性
tracial limit
C^*-algebra
closing property
