摘要
本文中,我们证明了如下结果:(1)环R是强正则的当且仅当R是左P-V-环且R的每个极大左理想是拟理想;(2)环R是强正则的当且仅当R是半素的且R的主左理想的极大左次理想是R的理想,所以有效推广了Kaplansky的如下结果:可换环R是VonNeumann正则的当且仅当每一个单R-模是内射的。
In this paper. we prove the following results: (1) A ring R is strongly regular if and only if R is a left p-V-ring and verey maximal left ideal of R is a quasiideal; (2) A ring R is trongly regular if and only if R is fully semiprime and every maximal left subideal in a principal ideal of R is an ideal. Therefore. the following important theorem of Kaplansky is effectively extended: A commutative ring R is von Neumann regular if and only if every simple R -module is injective. Further properties of p-V-rings are also considered .
关键词
强正则环
拟理想
VN正则环
PV环
Von Neumann regular ring
strongly regular ring
p-V-ring
quasi-ideal
maximal left subideal.
