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W. O. ALLTOP:
On the construction of block designs.
J. Comb. Theory(A) 1 (1966), 501-502.
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W. O. ALLTOP:
Some 3-designs and a 4-design.
J. Comb. Theory(A) 11 (1966), 190-195.
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TH. BETH, D. JUNGNICKEL, H. LENZ:
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A. BETTEN, R. LAUE, A. WASSERMANN:
A Steiner 5-Design on 36 Points.
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A. BETTEN, R. LAUE, S. MOLODTSOV, A. WASSERMANN:
Steiner systems with automorphism group ,
and
.
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R. H. F. DENNISTON:
The problem of the higher values of .
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R. H. F. DENNISTON:
Some new 5-designs.
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M. J. GRANNELL, T. S. GRIGGS, AND R. MATHON:
Some Steiner 5-designs with 108 and 132 points.
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M. J. GRANNELL, T. S. GRIGGS, AND R. MATHON:
Steiner systems with v = 72 and 84.
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B. HUPPERT:
Endliche Gruppen I.
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E. S. KRAMER, D. M. MESNER:
-designs on hypergraphs.
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R. MATHON:
Searching for spreads and packings.
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London Math. Soc. Lect. Notes, 1997bitemColbournMathon:96
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W. H. MILLS:
A new 5-design.
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R. LAUE, J. NEUBÜSER, U. SCHOENWAELDER:
Algorithms for finite soluble groups and the SOGOS system.
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R. LAUE:
Eine konstruktive Version des Lemmas von Burnside.
Bayreuther Math. Schr. 28 (1989), 111-125.
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R. LAUE:
Constructing objects up to isomorphism, simple 9-designs.
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I. NIVEN, H. S. ZUCKERMAN:
Einführung in die Zahlentheorie I.
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E. WITT:
Die 5-fach transitiven Gruppen von Mathieu.
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J. WOLFART:
Einführung in die Zahlentheorie und Algebra.
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N.N.
2002-02-25