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On the Deskins index complex of a maximal subgroup of a finite group

Zhang YuemingAdolfo Ballester-bolinchesGuo Xiuyun

subject

CombinatoricsNormal subgroupDiscrete mathematicsMathematics::Group TheoryNilpotentFinite groupMaximal subgroupAlgebra and Number TheorySubgroupIndex of a subgroupSubgroup CMathematics

description

AbstractLet M be a maximal subgroup of a finite group G. A subgroup C of G is said to be a completion of M in G if C is not contained in M while every proper subgroup of C which is normal in G is contained in M. The set, I(M), of all completions of M is called the index complex of M in G. Set P(M) = {C ϵ I(M) ¦ C} is maximal in I(M) and G = CM. The purpose of this note is to prove: A finite group G is solvable if and only if, for each maximal subgroup M of G, P(M) contains element C with CK(C) nilpotent.

yearjournalcountryeditionlanguage
1999-03-01Journal of Pure and Applied Algebra
https://doi.org/10.1016/s0022-4049(98)00178-9