拟AP-内射模的自同态环
殷晓斌, 黄晓林, 汪开云 - 山东大学学报(理学版), 2010 - lxbwk.njournal.sdu.edu.cn
拟AP-内射模的自同态环 Page 1 第45卷第6期 Vol.45 No.6 山东大学学报(理学版)
JournalofShandongUniversity(NaturalScience) 2010年6月 Jun.2010 收稿日期:20090710 基金 …
JournalofShandongUniversity(NaturalScience) 2010年6月 Jun.2010 收稿日期:20090710 基金 …
[PDF][PDF] On JPP rings, JPF rings and J-regular rings
Z Yu-e, Z Shujuan - International Mathematical Forum, 2011 - Citeseer
In this paper, we give some characterizations of JPP ring, JPF ring and J-regular rings. We
show that R is a left JPP ring⇔ every factor module of a J-injective left R− module is J …
show that R is a left JPP ring⇔ every factor module of a J-injective left R− module is J …
广义拟P-内射模的性质
赵玉娥, 陈正新 - 吉林大学学报(理学版), 2009 - xuebao.jlu.edu.cn
We combined the known properties of quasi AP-injective modules with the way of studying
quasi P-injective modules to give some new properties on quasi AP injective module. For …
quasi P-injective modules to give some new properties on quasi AP injective module. For …
On almost FGP-injective modules
Z Shu-juan - 2011 International Conference on System science …, 2011 - ieeexplore.ieee.org
This paper gives the definition of AFGP-injective ring, we show:(1) If R is a semiprime right
AFGP-injective ring, then every maximal right (or left) annihilator is a maximal right (left) …
AFGP-injective ring, then every maximal right (or left) annihilator is a maximal right (left) …
On nil-Flat Modules, Nil-Injective and nil-Flat Dimensions
Z Yu-e - 2011 Fourth International Conference on Intelligent …, 2011 - ieeexplore.ieee.org
This paper give the definition of N-coherent rings, and study the rings by nil-injective
modules and nil-flat modules. For an N-coherent ring R, we show that every nil-flat right R …
modules and nil-flat modules. For an N-coherent ring R, we show that every nil-flat right R …
[PDF][PDF] On QFGP-Injective Modules1
YE Zhao, XN Du - Int. J. Contemp. Math. Sciences, 2010 - m-hikari.com
In this paper, we give some characterizations and properties of QFGP-injective modules. It is
shown that if MR is a QFGP-injective R− module with S= End (MR), then for any 0= a∈ S …
shown that if MR is a QFGP-injective R− module with S= End (MR), then for any 0= a∈ S …