摘要
研究了满足一定条件的P-内射环为WB-环的等价刻画.证明了如果R是非奇异的P-内射环,那么R只要满足条件之一:(a)R满足特殊左零化子的升链条件;(b)R不包含由有限非零主左理想构成的直和项;(c)R是CF环;(d)R是Goldie环.有如下等价:(1)R是WB-环;(2)对任何a∈R,有正交理想I,J,使得a=aua=ava,这里u∈R,模I右可逆,v∈R模J左可逆;(3)对任何a∈R,有正交理想I,J和幂等元e∈R,使得a=eu=ev,这里u∈R模I右可逆,v∈R模J左可逆;(4)如果ab,a,b∈R,则有正交理想I,J,使得au=ub,av=vb,其中u∈R模I右可逆,v∈R模J左可逆.
Necessary and sufficient conditions under which a principal injective ring's equivalence is a WB-ring. It is proved that if R is a nonsingular and principal ring, R just satisfies one of the following con- ditions: (a) R satisfies the ascending chain condition for special left annihilators; (b) R does not contain a direct sum of an infinite number of non-zero principal left ideals; (c) R is a CF-ring; (d) R is a Goldie ring, then the following conditions are equivalent: (1) R is a WB-ring; (2) For any a E R ,there exists or- thogonal ideals I and J such that a = aua = ava, where u ∈R is fight invertible module I and v E R is left invertible module I; (3) For any a E R, there exists orthogonal ideals I, J and e = e^2∈ R such that a = eu = ev,whereu∈R is right invertible module I and v∈R is left invertible module J;(4) If a=b, a, b ∈ R, then there exists orthogonal ideals I, J such that au = ub, av = vb, where u E R is right invert- ible module I and v E R is left invertible module J.
出处
《成都大学学报(自然科学版)》
2012年第1期39-42,共4页
Journal of Chengdu University(Natural Science Edition)
基金
安徽省教育厅优秀青年人才基金(2009SQRZ223)
安徽省教育厅自然科学重点项目(KJ2010A126)资助项目
关键词
P-内射环
WB-环
正则环
正交理想
特殊左零化子升链条件
P-injective ring
WB-ring
regular ring
orthogonal ideal
the ascending chain condition for spe-cial left annihilators
