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Communications in Algebra Volume 46, 2018 - Issue 8
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Original Articles

Minimal prime ideals of reduced rings

Tsiu-Kwen LeeDepartment of Mathematics, National Taiwan University, Taipei, TaiwanCorrespondence[email protected]
&
Jheng-Huei LinDepartment of Mathematics, National Taiwan University, Taipei, Taiwan
Pages 3436-3441 | Received 21 Jul 2017, Published online: 17 Jan 2018

References

  • Andrunakievich, V. A., Rjabukhin, Yu. M. (1968). Rings without nilpotent elements and completely prime ideals. Dokl. Akad. Nauk SSSR 180:9–11 (in Russian), English translation: Soviet Math. 9:565–568.
  • Andrunakievich, V. A., Rjabukhin, Yu. M. (1979). Radicals of Algebras and Structural Theory. Moscov: Nauka (in russian).
  • Beidar, K. I., Martindale, W. S. III (1996). Rings with Generalized Identities. Monographs and Textbooks in Pure and Applied Mathematics, Vol. 196. New York: Marcel Dekker, Inc.
  • Beidar, K. I., Mikhalev, A. A. (1986). Orthogonal completeness and minimal prime ideals (Russian). Trudy Sem. Petrovsk. (1984), 10:227–234, English translation: J. Math. Sci. 35(6):2876–2882.
  • Beidar, K. I., Mikhalev, A. A. (1990). Semiprime rings with bounded indexes of nilpotent elements (Russian). Trudy Sem. Petrovsk. (1988), 13:237–249, English translation: J. Soviet Math. 50(2):1518–1526.
  • Bell, H. E. (1968). Duo rings: Some applications to commutativity theorems. Canad. Math. Bull. 11(3):375–380.
  • Birkenmeier, G. F., Kim, J. Y., Park, J. K. (1998). A characterization of minimal prime ideals. Glasgow Math. J. 40:223–236.
  • Chuang, C.-L., Lee, T.-K. (1991). Invariance of minimal prime ideals under derivations. Proc. Am. Math. Soc. 113:613–616.
  • Hong, C. Y., Kim, N. K., Lee, Y., Nielsen, P. P. (2009). The minimal prime spectrum of rings with annihilator conditions. J. Pure Appl. Algebra 213(7):1478–1488.
  • Kharchenko, V. K. (1979). Differential identities of semiprime rings. Algebra i Logika 18(1):86–119, English translation: Algebra Logic 18(1):58–80.
  • Klein, A. A. (1980). A simple proof of a theorem on reduced rings. Canad. Math. Bull. 23(4):495–496.
  • Krempa, J. (1996). Some examples of reduced rings. Algebra Colloq. 3:289–300.
  • Lee, T.-K. (2017). Anti-automorphisms satisfying an Engel condition. Commun. Algebra 45(9):4030–4036.
  • Matczuk, J. (2015). Minimal prime ideals and derivations. Contemporary Math. 634:223–225.
  • Matlis, E. (1983). The minimal prime spectrum of a reduced ring. Illinois J. Math. 27(3):353–391.
  • McCoy, N. H. (1973). Completely prime and completely semi-prime ideals. In: Rings, Modules and Radicals (Proc. Colloq., Keszthely, 1971). Colloq. Math. Soc. János Bolyai, Vol. 6. Amsterdam: North-Holland, pp. 147–152.
  • Rowen, L. H. (1988). Ring Theory, Vol. 1. New York: Academic Press.
  • Stewart, P. N. (1970). Semi-simple radical classes. Pacific J. Math. 32:249–255.
  • Thakare, N. K., Nimbhorkar, S. K. (1983). Space of minimal prime ideals of a ring without nilpotent elements. J. Pure Appl. Algebra 27:75–85.
  • Vasconcelos, W. (1969). On finitely generated flat modules. Trans. Am. Math. Soc. 138:505–512.

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