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Search: id:A064487
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| A064487 |
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Order of twisted Suzuki group Sz(2^(2*n + 1)), also known as the group 2B2(2^(2*n + 1)). |
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+0
3
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| 20, 29120, 32537600, 34093383680, 35115786567680, 36011213418659840, 36888985097480437760, 37777778976635853209600, 38685331082014736871587840, 39614005699412557795646504960, 40564799864499450381466515537920
(list; graph; listen)
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OFFSET
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0,1
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REFERENCES
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R. W. Carter, Simple Groups of Lie Type, Wiley 1972, Chap. 14.
J. H. Conway, R. T. Curtis, S. P. Norton, R. A. Parker and R. A. Wilson, ATLAS of Finite Groups. Oxford Univ. Press, 1985, p. xvi.
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LINKS
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M. Suzuki, A New Type Of Simple Groups of Finite Order
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FORMULA
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q^4*(q^2-1)*(q^4+1), where q^2 = 2^(2*n + 1).
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PROGRAM
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(GAP) g := Sz(32); s := Size(g);
(MAGMA) [ #Sz(2^(2*n+1)) : n in [0..10]]; - from Sergei Haller (sergei(AT)sergei-haller.de), Dec 21 2006
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CROSSREFS
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Cf. A037250, A064583.
Sequence in context: A167060 A146497 A060618 this_sequence A099187 A129041 A129040
Adjacent sequences: A064484 A064485 A064486 this_sequence A064488 A064489 A064490
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KEYWORD
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nonn
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AUTHOR
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Dan Fux (dan.fux(AT)OpenGaia.com or danfux(AT)OpenGaia.com), Oct 15 2001
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