N-group (finite group theory) について

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N-group (finite group theory) ：ウィキペディア英語版

N-group (finite group theory)

In mathematical finite group theory, an N-group is a group all of whose local subgroups (that is, the normalizers of nontrivial ''p''-subgroups) are solvable groups. The non-solvable ones were classified by Thompson during his work on finding all the minimal finite simple groups.
==Simple N-groups==

The simple N-groups were classified by in a series of 6 papers totaling about 400 pages.
The simple N-groups consist of the special linear groups PSL₂(''q''),PSL₃(3), the Suzuki groups Sz(2^2''n''+1), the unitary group U₃(3), the alternating group ''A''₇, the Mathieu group M₁₁, and the Tits group. (The Tits group was overlooked in Thomson's original announcement in 1968, but Hearn pointed out that it was also a simple N-group.) More generally Thompson showed that any non-solvable N-group is a subgroup of Aut(''G'') containing ''G'' for some simple N-group ''G''.
generalized Thompson's theorem to the case of groups where all 2-local subgroups are solvable. The only extra simple groups that appear are the unitary groups U₃(''q'').

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