Finite groups with a centralizer of sixth order

1. W. Feit and J. G. Thompson, "Finite groups which contain a self-centralizing subgroup of third order," Nagoya Math. J.,21, 570–576 (1962).

   Google Scholar 

2. V. D. Mazurov, "Finite groups with a given Sylow two-subgroup," Dokl. Akad. Nauk SSSR,168, No. 3, 519–521 (1966).

   Google Scholar 

3. V. V. Kabanov, "Finite groups with a self-centralizing subgroup of sixth order," Algebra Logika,11, No. 5, 509–515 (1972).

   Google Scholar 

4. V. V. Kabanov, "Finite groups with a self-centralizing subgroup of sixth order and one class of involutions," Algebra Logika,11, No. 5, 516–534 (1972).

   Google Scholar 

5. A. A. Makhnev, "Groups with a centralizer of sixth order," Mat. Zametki,22, No. 1, 153–159 (1977).

   Google Scholar 

6. V. D. Mazurov, "Centralizers of involutions in simple groups," Mat. Sb.,93, No. 4, 529–539 (1974).

   Google Scholar 

7. G. Higman, Odd Characterizations of Finite Simple Groups, Lecture Notes, Univ. Michigan (1968).

8. J. Walter, "The characterization of finite groups with Abelian Sylow two-subgroups," Ann. Math.,89, 405–514 (1969).

   Google Scholar 

9. A. N. Fomin, "Finite two-groups in which the centralizer of some involution has eighth order," Mat. Zap. Ural. Univ.,8, No. 3, 122–132 (1972).

   Google Scholar 

10. A. D. Ustyuzhaninov, "Finite two-groups with three involutions," Sib. Mat. Zh.,13, No. 1, 182–197 (1972).

    Google Scholar 

11. D. Goldschmidt, "Two-fusion in finite groups," Ann. Math.,99, 70–117 (1974).

    Google Scholar 

12. D. Gorenstein and K. Harada, "A characterization of Janko's two new simple groups," J. Faculty Sci. Univ. Tokyo, Sec. IA, Math.,16, No. 3, 331–406 (1970).

    Google Scholar 

13. A. S. Kondrat'ev, "Finite simple groups whose Sylow two-subgroup is an extension of an Abelian group by a group of rank 1," Algebra Logika,14, No. 3, 288–303 (1975).

    Google Scholar 

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