We use the class of L-injective modules to define L-injective covers, and provide the characterizations of L-injective covers by the properties of kernels of homomorphisms. We prove that the right L-noetherian right L...We use the class of L-injective modules to define L-injective covers, and provide the characterizations of L-injective covers by the properties of kernels of homomorphisms. We prove that the right L-noetherian right L-hereditary ring is just such that every right R-module has an L-injective cover which is monic. We also use kernels of homomorphisms to investigate L-simple L-injective covers and give some constructions of L-simple L-injective covers.展开更多
设R是环,证明了:1)R是右Noether,右单J-内射环,且Sr≤eRR或R是右Goldie,右单J-内射环,且Sr≤eRR,则R是右QF环;2)如果R是左完全环且当Rk或kR是单左或右理想时,r(k)是有限生成的,则R是右QF环.推广了文献[2]中Nicholson W K,Park J K,Yousi...设R是环,证明了:1)R是右Noether,右单J-内射环,且Sr≤eRR或R是右Goldie,右单J-内射环,且Sr≤eRR,则R是右QF环;2)如果R是左完全环且当Rk或kR是单左或右理想时,r(k)是有限生成的,则R是右QF环.推广了文献[2]中Nicholson W K,Park J K,Yousif M F的相关结论并使著名的Faith猜想有了新的进展.展开更多
对环R,令ip(R_R)={a∈R:任意一个从R的右理想到R且象为aR的模同态能开拓到R}。众所周知,R为右IP-内射环当且仅当R=ip(R_R),R为右单-内射环当且仅当{a∈R:aR is simple)(?)ip(R_R)。对环R的一个子集S,我们引进了S-IP-内射环的概念,即满...对环R,令ip(R_R)={a∈R:任意一个从R的右理想到R且象为aR的模同态能开拓到R}。众所周知,R为右IP-内射环当且仅当R=ip(R_R),R为右单-内射环当且仅当{a∈R:aR is simple)(?)ip(R_R)。对环R的一个子集S,我们引进了S-IP-内射环的概念,即满足S(?)ip(R_R)的环。并得到了这种环的一些性质。展开更多
基金The Tianyuan Mathematics Fund (A0324612) of China.
文摘We use the class of L-injective modules to define L-injective covers, and provide the characterizations of L-injective covers by the properties of kernels of homomorphisms. We prove that the right L-noetherian right L-hereditary ring is just such that every right R-module has an L-injective cover which is monic. We also use kernels of homomorphisms to investigate L-simple L-injective covers and give some constructions of L-simple L-injective covers.
文摘设R是环,证明了:1)R是右Noether,右单J-内射环,且Sr≤eRR或R是右Goldie,右单J-内射环,且Sr≤eRR,则R是右QF环;2)如果R是左完全环且当Rk或kR是单左或右理想时,r(k)是有限生成的,则R是右QF环.推广了文献[2]中Nicholson W K,Park J K,Yousif M F的相关结论并使著名的Faith猜想有了新的进展.
基金the Specialized Research Fund for the Doctoral Program of Higher Education of China (20020284009, 20030284033)the Postdoctoral Research Fund of China (2005037713)Jiangsu Planned Projects for Postdoctoral Research Fund (0203003403)
文摘对环R,令ip(R_R)={a∈R:任意一个从R的右理想到R且象为aR的模同态能开拓到R}。众所周知,R为右IP-内射环当且仅当R=ip(R_R),R为右单-内射环当且仅当{a∈R:aR is simple)(?)ip(R_R)。对环R的一个子集S,我们引进了S-IP-内射环的概念,即满足S(?)ip(R_R)的环。并得到了这种环的一些性质。