Finite groups in which every maximal subgroup is nilpotent or normal or has p'-order
Abstract
Let G be a finite group and p a fixed prime divisor of |G|. Combining the nilpotence, the normality and the order of groups together, we prove that if every maximal subgroup of G is nilpotent or normal or has p'-order, then (1) G is solvable; (2) G has a Sylow tower; (3) There exists at most one prime divisor q of |G| such that G is neither q-nilpotent nor q-closed, where q≠ p.
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