Extensions of a theorem of P. Hall on indexes of maximal subgroups
Abstract
We extend a classical theorem of P. Hall that claims that if the index of every maximal subgroup of a finite group G is a prime or the square of a prime, then G is solvable. Precisely, we prove that if one allows, in addition, the possibility that every maximal subgroup of G is nilpotent instead of having prime or squared-prime index, then G continues to be solvable. Likewise, we obtain the solvability of G when we assume that every proper non-maximal subgroup of G lies in some subgroup of index prime or squared prime.
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