论文信息 - WEAKLY CONTINUOUS AND C2-RINGS

WEAKLY CONTINUOUS AND C2-RINGS

A ring R is called right weakly continuous if the right annihilator of each element is essential in a summand of R, and R satisfies the right C2-condition (every right ideal that is isomorphic to a direct summand of R is itself a direct summand). We show that a ring R is right weakly continuous if and only if it is semiregular and J(R) = Z(R R ). Unlike right continuous rings, these right weakly continuous rings form a Morita invariant class. The rings satisfying the right C2-condition are studied and used to investigate two conjectures about strongly right Johns rings and right FGF-rings and their relation to quasi-Frobenius rings.

W. K. Nicholson | M. Yousif

[1] W. K. Nicholson,et al. Annihilators and the CS-condition , 1998, Glasgow Mathematical Journal.

[2] M. Yousif. On Continuous Rings , 1997 .

[3] J. G. Pardo,et al. Rings with finite essential socle , 1997 .

[4] W. K. Nicholson,et al. Principally Injective Rings , 1995 .

[5] S. Page. Large fpf rings , 1995 .

[6] John Dauns. Modules and Rings , 1994 .

[7] C. Faith,et al. The structure of Johns rings , 1994 .

[8] R. Camps,et al. On semilocal rings , 1993 .

[9] C. Faith,et al. A counter example to a conjecture of Johns , 1992 .

[10] V. Camillo,et al. Continuous Rings with Acc on Annihilators , 1991, Canadian Mathematical Bulletin.

[11] A. Schofield,et al. On semihereditary rings , 1988 .

[12] Friedrich Dischinger,et al. Left pf is not right pf , 1986 .

[13] W. K. Nicholson. Semiregular Modules and Rings , 1976, Canadian Journal of Mathematics.

[14] K. Goodearl. Ring Theory: Nonsingular Rings and Modules , 1976 .

[15] Frank W. Anderson,et al. Rings and Categories of Modules , 1974 .

[16] J. Björk. Radical properties of perfect modules. , 1972 .

[17] J. Björk. Rings satisfying certain chain conditions. , 1970 .

[18] H. Tachikawa. A generalization of quasi-Frobenius rings , 1969 .

[19] Y. Utumi. On continuous rings and self injective rings , 1965 .

[20] I. Herstein,et al. Nil Rings Satisfying Certain Chain Conditions , 1964, Canadian Journal of Mathematics.