Serial rings with krull dimension
Glasgow mathematical journal, Tome 32 (1990) no. 1, pp. 71-78

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A module is said to be serial if it has a unique chain of submodules, and a ring is serial if it is a direct sum of serial right ideals and a direct sum of serial left ideals. The serial rings of Krull dimension 0 are the Artinian serial (or generalised uniserial) rings studied by Nakayama and for which there is an extensive theory (see for example [4]). Warfield in [10] extended the theory to the non-Artinian case. In particular he showed that a Noetherian serial ring is a direct sum of Artinian serial rings and prime Noetherian serial rings, and he gave a structure theorem in the prime Noetherian case. A Noetherian non-Artinian serial ring has Krull dimension 1. Serial rings of arbitrary Krull dimension have been studied by Wright ([9], [12], [13], [14]) with special results being proved when the Krull dimension is 1 or 2.
Chatters, A. W. Serial rings with krull dimension. Glasgow mathematical journal, Tome 32 (1990) no. 1, pp. 71-78. doi: 10.1017/S0017089500009071
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[1] 1.Chatters, A. W. and Hajarnavis, C. R., Rings in which every complement right ideal is a direct summand, Quart. J. Math. Oxford Ser. (2) 28 (1977), 61–80. Google Scholar | DOI

[2] 2.Chatters, A. W., A note on Noetherian orders in Artinian rings, Glasgow Math. J. 20 (1979), 125–128. Google Scholar | DOI

[3] 3.Chatters, A. W. and Hajarnavis, C. R., Rings with chain conditions (Pitman, 1980). Google Scholar

[4] 4.Eisenbud, D. and Griffith, P., Serial rings, J. Algebra 17 (1971), 389–400. Google Scholar | DOI

[5] 5.Gordon, R. and Robson, J. C., Krull dimension, Mem. Amer. Math. Soc. 133 (1973). Google Scholar

[6] 6.Lenagan, T. H., Reduced rank in rings with Krull dimension, Ring Theory (Proc. Antwerp Conference, 1978), Lecture Notes in Pure and Appl. Math. 51 (Dekker, 1979), 123–131. Google Scholar

[7] 7.Levy, L. S., Torsion-free and divisible modules over non-integral-domains, Canad. J. Math. 15 (1963), 132–151. Google Scholar | DOI

[8] 8.Singh, S., Serial right Noetherian rings, Canad J. Math. 36 (1984), 22–37. Google Scholar | DOI

[9] 9.Upham, M. H., Serial rings with right Krull dimension one, J. Algebra 109 (1987), 319–333. Google Scholar | DOI

[10] 10.Warfield, R. B. Jr, Serial rings and finitely presented modules, J. Algebra 37 (1975), 187–222. Google Scholar | DOI

[11] 11.Warfield, R. B. Jr, Bezout rings and serial rings, Comm. Algebra, 7 (1979), 533–545. Google Scholar | DOI

[12] 12.Wright, M. H., Certain uniform modules over serial rings are uniserial, Comm. Algebra 17 (1989), 441–469. Google Scholar | DOI

[13] 13.Wright, M. H., Serial rings with right Krull dimension one, II, J. Algebra 117 (1988), 99–116. Google Scholar | DOI

[14] 14.Wright, M. H., Krull dimension in serial rings, J. Algebra 124 (1989), 317–328. Google Scholar | DOI

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