1 |
J. T. Arnold and J. W. Brewer, Commutative rings which are locally Noetherian, J. Math. Kyoto Univ. ll(1971), 45-49.
|
2 |
G. W. Chang, Strong Mori domains and the ring D[X] , J. Pure Appl. Algebra 197 (2005), 293-304.
DOI
ScienceOn
|
3 |
G. Fusacchia, Strong semistar Noetherian domains, Houston J. Math., to ap- pear in Houston J. Math.
|
4 |
R. Gilmer, Multiplicative Ideal Theory, Queen's Papers in Pure and Applied Mathematics, 90, Queen's University, Kingston, Ontario, 1992.
|
5 |
W. Heinzer and J. Ohm, Locally Noetherian commutative rings, Trans. Amer. Math. Soc. 158 (1971), 273-284.
DOI
ScienceOn
|
6 |
T. Ishikawa, Faithfully exact functors and their applications to projective modules and injective modules, Nagoya Math. J. 24 (1964), 29-42.
DOI
|
7 |
B. G. Kang, Prufer v-multiplication domains and the ring R[X] , J. Algebra 123 (1989), 151-170.
DOI
|
8 |
H. Kim, Module-theoretic characterizations of t-linkative domains, Comm. Algebra 36 (2008), 1649-1670.
DOI
ScienceOn
|
9 |
E, Matlis, Modules with descending chain condition, Trans, Amer. Math. Soc. 97 (1960), 495-508.
DOI
ScienceOn
|
10 |
H. Uda, On a characterization of almost Dedekind domains, Hiroshima Math. J. 2 (1972), 339-344.
|
11 |
F. Wang and R. L. McCasland, On w-modules over strong Mori domains, Comm. Algebra 25 (1997), 1285-1306.
DOI
ScienceOn
|
12 |
F.Wang and R. L. McCasland, On strong Mori domains, J. Pure Appl. Algebra 135 (1999), 155-165.
DOI
ScienceOn
|