The proper definition and Wielandt-Hartley's theorem for submaximal X-subgroups
Abstract
A nonempty class X of finite groups is called complete if it is closed under taking subgroups, homomorphic images and extensions. We deal with a classical problem of determining X-maximal subgroups. We consider two definitions of submaximal X-subgroups suggested by Wielandt and discuss which one better suits our task. We prove that these definitions are not equivalent yet Wielandt-Hartley's theorem holds true for either definition of X-submaximality. We also give some applications of the strong version of Wielandt-Hartley's theorem.
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