Radicals of abelian groups and associative rings

  • B. J. Gardner
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Keywords

Abelian Group Associative Ring 
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References

  1. [1]
    S. A. Amitsur, A general theory of radicals II. Radicals in rings and bicategories,Amer. J. Math. 76 (1954), pp. 100–125.Google Scholar
  2. [2]
    S. A. Amitsur, Radicals of polynomial rings,Canda. J. Math.,8 (1956), pp. 355–361.Google Scholar
  3. [3]
    В. А. АНЛруНакиевич, РадикадЫ ассоциативнъХ кодецЫ, Мамем Сб. (Н. С.)44 (86) (1958), pp. 179–212.English translation: Radicals of accosiative ringsI, Amer Math. Soc. Transl. (Second Series)52, pp. 95-128.Google Scholar
  4. [4]
    E. P. Armendariz, Herdeitary subradicals of the lower Baer radical,Publ. Math. Deberecen,15 (1968), pp. 91–93.Google Scholar
  5. [5]
    E. P. ArmendarizW. G. Leavitt, The hereditary property in the lower radical construction,Canad J. Math.,20 (1968), pp. 474–476.Google Scholar
  6. [6]
    S. E. Dickson, On torsion classes of abelian groups,J. Math. Soc. Japan,17 (1965), pp. 30–35.Google Scholar
  7. [7]
    S. E. Dickson, A torsion theory for abelian categories,Trans. Amer. Math. Soc.,121 (1966). pp. 223–235.Google Scholar
  8. [8]
    N. J. Divinsky,Rings and radicals, George Allen and Unwin Ltd. (London, 1965).Google Scholar
  9. [9]
    B. J. Gardner, Torsion classes and pure subgroupsPacific J. Math.,33 (1970), pp. 109–116.Google Scholar
  10. [10]
    B. J. Gardner, Some closure properties for torsion classes of abelian groups (to appear).Google Scholar
  11. [11]
    G. Köthe, Die Struktur der Ringe, deren Restklassenring nach dem Radikal vollständig reduzibe ist,Math. Z.,32, (1930), pp. 161–186.CrossRefGoogle Scholar
  12. [12]
    Ч. Г. КуроШ, РадикалЫ кодец и алтэбр. Мамэм. Сб. (Н. С.),33 (75) (1953), pp. 13–26.Google Scholar
  13. [13]
    А. Г. КуроШ, РадикалЫ В теории групп, С Мамем. Qz.,3 (1962), pp. 912–931.Google Scholar
  14. [14]
    W. G. Leavitt, Sets of radical classes.,Publ. Math. Debrecen,14 (1967), pp. 321–324.Google Scholar
  15. [15]
    Е. Г. ШулбгейФер, Функторная харктеризация стрових раликалов в кателориях Сuбuркuû Мамем. Qz.,7 (1966), pp. 1412–1421.English translation: Funtor characterization of strict radicals in categories, Siberian Math. J.,7 (1966), pp. 1102–1111.Google Scholar
  16. [16]
    A. SulinskiR. AndersonN. Divinsky Lower radical properties for associative and alternative rings.,J. London Math. Soc.,41 (1966), pp. 417–424.Google Scholar
  17. [17]
    T. Szele, Zur Theorie der Zeroringe,Math. Ann. 121 (1946), pp. 242–256CrossRefGoogle Scholar
  18. [18]
    T. Szele, Gruppentheoretische Beziehngen bei gewissen Ringkonstruktionen,Math. Z.,54, (1951), pp. 168–180.CrossRefGoogle Scholar

Copyright information

© Akadémiai Kiadó 1973

Authors and Affiliations

  • B. J. Gardner
    • 1
  1. 1.Mathematics departmentUniveristy of TasmaniaHobartAustralia

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