@article {
author = {},
title = {IDEAL J *-ALGEBRAS},
journal = {Journal of Sciences, Islamic Republic of Iran},
volume = {5},
number = {1},
pages = {-},
year = {1994},
publisher = {University of Tehran},
issn = {1016-1104},
eissn = {2345-6914},
doi = {},
abstract = {A C *-algebra A is called an ideal C * -algebra (or equally a dual algebra) if it is an ideal in its bidual A**. M.C.F. Berglund proved that subalgebras and quotients of ideal C*-algebras are also ideal C*-algebras, that a commutative C *-algebra A is an ideal C *-algebra if and only if it is isomorphicto C (Q) for some discrete space ?. We investigate ideal J*-algebras and show that the above results can be generalized to that of .I*-algebras. Furthermore, it is proved that if A is an ideal ,J*-algebra, then sp(a* a) has no nonzero limit point for each a in A and consequently A has semifinite rank and is a restricted product of its simple ideals},
keywords = {},
url = {https://jsciences.ut.ac.ir/article_31380.html},
eprint = {https://jsciences.ut.ac.ir/article_31380_9d9445565a925df07e365566e8e4ea9d.pdf}
}