论文信息 - Integral Closure of a Ring Whose Regular Ideals Are Finitely Generated

Integral Closure of a Ring Whose Regular Ideals Are Finitely Generated

Abstract We show that if R is a commutative ring with identity whose regular ideals are finitely generated, then the integral closure of R is a Krull ring. This is a generalization of the Mori–Nagata theorem that the integral closure of a Noetherian domain is a Krull domain.

B. Kang | G. Chang

[1] D. D. Anderson. A note on minimal prime ideals , 1994 .

[2] B. Kang. Integral Closure of Rings with Zero Divisors , 1993 .

[3] B. Kang. Characterizations of Krull rings with zero divisors , 1991 .

[4] J. Huckaba. Commutative Rings with Zero Divisors , 1988 .

[5] Ryuki Matsuda. On Kennedy's Problems , 1982 .

[6] J. Huckaba,et al. Quotient rings of polynomial rings , 1980 .

[7] J. Matijevic. Maximal ideal transforms of Noetherian rings , 1976 .

[8] R. Fossum. The Divisor Class Group of a Krull Domain , 1973 .

[9] Max D. Larsen,et al. Multiplicative theory of ideals , 1973 .

[10] Michael Francis Atiyah,et al. Introduction to commutative algebra , 1969 .