A ring R is called left morphic, if for any a ∈ R, there exists b ∈ R such that lR(a) =Rb and lR(b)= Ra. In this paper, we use the method which is different from that of Lee and Zhou to investigate when R[x, σ]...A ring R is called left morphic, if for any a ∈ R, there exists b ∈ R such that lR(a) =Rb and lR(b)= Ra. In this paper, we use the method which is different from that of Lee and Zhou to investigate when R[x, σ]/(x^n) is (left) morphic and when the ideal extension E(R, V) is (left) morphic. It is mainly shown that: (1) If is an automorphism of a division ring R, then S = R[x, σ]/(x^n) (n 〉 1) is a special ring. (2) If d,m are positive integers and n = dm, then E(Zn, mZn) is a morphic ring if and only if gcd(d, m) = 1.展开更多
Let R be a ring. We define a dimension, called P-cotorsion dimension, for modules and rings. The aim of this article is to investigate P-cotorsion dimensions of modules and rings and the relations between P-cotorsion ...Let R be a ring. We define a dimension, called P-cotorsion dimension, for modules and rings. The aim of this article is to investigate P-cotorsion dimensions of modules and rings and the relations between P-cotorsion dimension and other homological dimensions. This dimension has nice properties when the ring in consideration is generalized morphic.展开更多
基金The National Natural Science Foundation (10571026) of China, and the Natural Science Foundation (BK2005207) of Jiangsu Province.
文摘A ring R is called left morphic, if for any a ∈ R, there exists b ∈ R such that lR(a) =Rb and lR(b)= Ra. In this paper, we use the method which is different from that of Lee and Zhou to investigate when R[x, σ]/(x^n) is (left) morphic and when the ideal extension E(R, V) is (left) morphic. It is mainly shown that: (1) If is an automorphism of a division ring R, then S = R[x, σ]/(x^n) (n 〉 1) is a special ring. (2) If d,m are positive integers and n = dm, then E(Zn, mZn) is a morphic ring if and only if gcd(d, m) = 1.
基金supported by Collegial Natural Science Research Program of Education Department of Jiangsu Province (07KJD110043)
文摘Let R be a ring. We define a dimension, called P-cotorsion dimension, for modules and rings. The aim of this article is to investigate P-cotorsion dimensions of modules and rings and the relations between P-cotorsion dimension and other homological dimensions. This dimension has nice properties when the ring in consideration is generalized morphic.
