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Communications in Algebra Volume 34, 2006 - Issue 1
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Original Articles

On the (2, 3, 7)-Generation of Some Special Linear Groups

Yongzhong Sun School of Mathematics and Statistics, University of Birmingham, Birmingham, UKCorrespondence[email protected]
Pages 51-74 | Received 16 Feb 2004, Accepted 24 Jun 2005, Published online: 03 Sep 2006

REFERENCES

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  • Conder , M. D. E. ( 1981 ). More on generators for alternating and symmetric groups . Quart. J. Math. Oxford Ser. 32 ( 2 ): 137 – 163 [CSA]
  • Hurwitz , A. ( 1893 ). Über algebraische gebilde mit eindeutigen transformationen in sich . Math. Ann. 41 : 403 – 442 [CSA] [CROSSREF]
  • Lucchini , A. , Tamburini , M. C. , Wilson , J. S. ( 2000 ). Hurwitz groups of large rank . J. London Math. Soc. 61 ( 2 ): 81 – 92 [CSA] [CROSSREF]
  • Macbeath , A. M. ( 1969 ). Generators of the linear fractional groups . Number Theory. ( Proc. Symp. Pure Math. Vol. XII, Houston, TX, 1967 ). Providence , RI : Amer. Math. Sci., pp. 14 – 32 .
  • Sun , Y. ( 2003 ). On degrees of alternating and special linear groups as quotients of triangle groups . Ph.D. Thesis, The University of Birmingham, UK.
  • Wielandt , H. ( 1964 ). Finite Permutation Groups . New York and London : Academic Press .
  • Wilson , J. S. ( 1999 ). Simple images of triangle groups . Quart. J. Math. Oxford Ser. 50 ( 2 ): 521 – 531 [CSA]
  • Wilson , J. S. ( 2000 ). Variations on a theme of Higman and Conder . In: Groups—Korea 98 (Pusan) . Berlin : de Gruyter , pp. 367 – 375 .
  • Wilson , R. A. ( 2001 ). The monster is a Hurwitz group . J. Group Theory 4 ( 4 ): 367 – 374 [CSA]

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