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6q+1级2—传递置换群,q为素数
引用本文:李慧陵,沈虹. 6q+1级2—传递置换群,q为素数[J]. 数学研究及应用, 1986, 6(1): 55-61
作者姓名:李慧陵  沈虹
作者单位:兰州大学;西安工业学院
摘    要:In [ 3 ] M. D. Atkinson conjectured that if G is a doubly transitive but not doubly primitive permutation group on Ω, then G is of one of the following four types: i) Metacyclic groups of prime degree p and of order p(p -1); ii) Groups of degree 2p and of order 2p(2p-1)or 2p(2p-l)p for some prime p;iii)Gr-oups of automorphisms of a block design with λ=1; iv) Sz(q)≤G≤Aut(Sz(g)).In this paper we proved this conjecture in a special case without using the result of classification of finte simple groups, Qur explicit result is as follows: Theorem. Let G be a doubly transitive group on set Ω,where |Ω|=6q+1 and q is a prime, then one of the following holds: i)G is doubly primitive on Ω;ii) G is sharply doubly transitive on Ω; iii) G is a groups of automorphisms of a block design with λ=1.

收稿时间:1982-02-12

Deubly transitive permutation groups of degree 6q + 1, q being a prime
Li Huiling and Shen Hong. Deubly transitive permutation groups of degree 6q + 1, q being a prime[J]. Journal of Mathematical Research with Applications, 1986, 6(1): 55-61
Authors:Li Huiling and Shen Hong
Affiliation:Lanzhou University;Xi'an Industry Iustitute
Abstract:
Keywords:
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