References
Amitsur, S.A.: On rings of quotients Symposia Mathematica8, 149–164. New York-London: Academic Press 1972
Bergman, G.M.: Lifting prime ideals to extensions by centralizing elements, (unpublished)
Bergman, G.M.: More on extensions by centralizing elements, (unpublished)
Cohen, M., Montgomery, S.: The normal closure of a semiprime ring. In: Ring Theory, ed. F. Van Oystaeyen. New York: Marcel Dekker 1979
Formanek, E., Jategaonkar, A.V.: Subrings of Noetherian rings. Proc. Amer. Math. Soc.46, 181–186 (1974)
Kharchenko, V.K.: Generalized identities with automorphisms Algebra and Logic14, 132–148 (1975)
Lorenz, M., Passman, D.S.: Prime ideals in crossed products of finite groups. Israel J. Math.33, 89–132 (1979)
Lorenz, M., Passman, D.S.: Addendum-Prime ideals in crossed products of finite groups. Israel J. Math.35, 311–322 (1980)
Lorenz, M., Passman, D.S.: Integrality and normalizing extensions of rings. J. Algebra61, 289–297 (1979)
Lorenz, M., Passman, D.S.: Prime ideals in group algebras of polycyclic-by-finite groups. Proc. London Math. Soc. (to appear)
Martindale, W.S.: Prime rings satisfying a generalized polynomial identity. J. Algebra12, 576–584 (1969)
Montgomery, S., Passman, D.S.: Crossed products over prime rings. Israel J. Math.31, 224–256 (1978)
Paré, R., Schelter, W.: Finite extensions are integral. J. Algebra53, 477–479 (1978)
Passman, D.S.: The Algebraic Structure of Group Rings. New York: Wiley-Interscience 1977
Procesi, C.: Rings with Polynomial Identities. New York: Marcel Dekker 1973
Robson, J.C., Small, L.W.: Liberal extensions. Proc. London Math. Soc., (to appear)
Roseblade, J.E.: Prime ideals in group rings of polycyclic groups. Proc. London Math. Soc.36, 385–447 (1978)
Schelter, W.: Non-commutative affinePI-rings are catenary J. Algebra51, 12–18 (1978)
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Lorenz, M. Finite normalizing extensions of rings. Math Z 176, 447–484 (1981). https://doi.org/10.1007/BF01214757
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DOI: https://doi.org/10.1007/BF01214757