On the Length of a Maximal Subgroup of a Finite Group
Abstract
For a finite group G and its maximal subgroup M we proved that the generalized Fitting height of M can't be less by 2 than the generalized Fitting height of G and the non-p-soluble length of M can't be less by 1 than the non-p-soluble length of G. We constructed a hereditary saturated formation F such that \nσ(G, F)-nσ(M, F) G is finite σ-soluble and M is a maximal subgroup of G\=N\0\ where nσ(G, F) denotes the σ-nilpotent length of the F-residual of G. This construction shows the results about the generalized lengths of maximal subgroups published in Math. Nachr. (1994) and Mathematics (2020) are not correct.
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