On p-groups of finite order

1. P. Roquette, “Realisierung von Darstellungen endlicher nilpotenter Gruppen,” Arch. Math.,9, 241–250 (1958).

   Google Scholar 

2. M. Hall, The Theory of Groups, Macmillan, New York (1962).

   Google Scholar 

3. W. Feit, M. Hall, and J.G. Thompson, “Finite groups in which the centralizer of any nonidentity element is nilpotent,” Math. Zeitschr.,74, 1–17 (1961).

   Google Scholar 

4. R. Brauer, M. Suzuki, and G.E. Wall, “A characterization of the one-dimensional unimodular-projective groups over finite fields,” Illinois J. Math.,2, 4B, 718–746 (1958).

   Google Scholar 

5. D. Gorenstein, “Finite groups in which Sylow 2-subgroups are abelian and centralizers of involutions are soluble,” Carad. J. Math.,17, No. 6, 860–906 (1965).

   Google Scholar 

6. D. Gorenstein and J.H. Walter, “On finite groups with dihedral Sylow 2-subgroups,” Illinois J. Math.,6, No. 4, 553–593 (1962).

   Google Scholar 

7. Ch. Hobby, “The Frattini subgroups of a p-group,” Pacific J. Math.,10, No. 1, 209–212 (1960).

   Google Scholar 

8. G.A. Miller, “On the groups of order p^m which contain an operator of order p^m−2,” Trans. Amer. Math. Soc.,3, 383–387 (1902).

   Google Scholar 

9. L.J. Neikirk, “Groups of order p^m which contain cyclic subgroups of index p³,” Trans. Amer. Math. Soc.,6, 316–325 (1905).

   Google Scholar 

10. P. Hall, “A contribution to the theory of groups of prime-power order,” Proc. London Math. Soc.,36, 29–95 (1933).

    Google Scholar 

11. W. Gaschütz, “Über die ϕ-Untergruppe endlicher Gruppen,” Math. Zeitschr.,58, 160–170 (1953).

    Google Scholar 

12. B. Huppert, “Über das Produkt von paarweise vertauschbaren zyklischen Gruppen,” Math. Zeitschr.,58, 243–264 (1953).

    Google Scholar 

13. W.R. Scott, Group Theory, Prentice Hall, New Jersey (1964).

    Google Scholar 

14. N. Ito and A. Ohara, “Sur les groups factorisables par deux 2-groups cycliques,” Proc. Japan Acad.,32, 736–743 (1956).

    Google Scholar 

15. H. Zassenhaus, The Theory of Groups, Chelsea Publishing Company (1958).

16. G.A. Miller, “Determination of all groups of order p^m which contain an abelian group of type (n−2.1).” Trans. Amer. Math. Soc.,2, 259–272 (1901).

    Google Scholar 

17. G.A. Miller, “Determination of all groups of order p^m...,” Trans. Amer. Math. Soc.,3, 499–500 (1902).

    Google Scholar 

18. L.-K. Hua and H.-F. Tuan, “Determination of the groups of odd-prime-power order p^m, which contain a cyclic subgroup of index p²,” Sci. Rep. Nat. Tsing Hua Univ., (A)4, 145–154 (1940).

    Google Scholar 

19. W. Feit and J.G. Thompson, “Solvability of groups of odd order,” Pacific J. Math.,133, 775–1029 (1963).

    Google Scholar 

20. V.D. Mazurov, “On finite groups with metacyclic Sylow 2-subgroups,” Sibirsk. Matem. Zh.,8, No. 5, 966–982 (1967).

    Google Scholar 

21. C. Hobby, “Generalization of a theorem of N. Blackburn,” Illinois J. Math.,5, 225–227 (1961).

    Google Scholar 

22. M. Tazawa, “Remarks on Frobenius and Kulzkoff's theorems on p-groups,” Sci. Rep. Tohoku Univ., Is,23, 449–476 (1934).

    Google Scholar 

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