We describe finite soluble nonnilpotent groups in which every minimal nonnilpotent subgroup is abnormal. We also show that if G is a nonsoluble finite group in which every minimal nonnilpotent subgroup is abnormal, then G is quasisimple and $Z(G)$ is cyclic of order $|Z(G)|\in \{1, 2, 3, 4\}$ .
In this paper, πΊ is a finite group and π a partition of the set of all primes β, that is, Ο = { Ο i β£ i β I } \sigma=\{\sigma_{i}\mid i\in I\} , where P = β i β I Ο i \mathbb{P}=\bigcup_{i\in I}\sigma_{i} and Ο i β© Ο j = β \sigma_{i}\cap\sigma_{j}=\emptyset for all i β j i\neq j . If π is an integer, we write Ο β’ ( n ) = { Ο i β£ Ο i β© Ο β’ ( n ) β β } \sigma(n)=\{\sigma_{i}\mid\sigma_{i}\cap\pi(n)\neq\emptyset\} and Ο β’ ( G ) = Ο β’ ( | G | ) \sigma(G)=\sigma(\lvert G\rvert) . A group πΊ is said to be π-primary if πΊ is a Ο i \sigma_{i} -group for some i = i β’ ( G ) i=i(G) and π-soluble if every chief factor of πΊ is π-primary. We say that πΊ is a π-tower group if either G = 1 G=1 or πΊ has a normal series 1 = G 0 < G 1 < β― < G t - 1 < G t = G 1=G_{0}<G_{1}<\cdots<G_{t-1}<G_{t}=G such that G i / G i - 1 G_{i}/G_{i-1} is a Ο i \sigma_{i} -group, Ο i β Ο β’ ( G ) \sigma_{i}\in\sigma(G) , and G / G i G/G_{i} and G i - 1 G_{i-1} are Ο i β² \sigma_{i}^{\prime} -groups for all i = 1 , β¦ , t i=1,\ldots,t . A subgroup π΄ of πΊ is said to be π-subnormal in πΊ if there is a subgroup chain A = A 0 β€ A 1 β€ β― β€ A t = G A=A_{0}\leq A_{1}\leq\cdots\leq A_{t}=G such that either A i - 1 β’ β΄ β’ A i A_{i-1}\trianglelefteq A_{i} or A i / ( A i - 1 ) A i A_{i}/(A_{i-1})_{A_{i}} is π-primary for all i = 1 , β¦ , t i=1,\ldots,t . In this paper, answering to Question 4.8 in [A.βN. Skiba, On π-subnormal and π-permutable subgroups of finite groups, J. Algebra 436 (2015), 1β16], we prove that a π-soluble group G β 1 G\neq 1 with | Ο β’ ( G ) | = n \lvert\sigma(G)\rvert=n is a π-tower group if each of its ( n + 1 ) (n+1) -maximal subgroups is π-subnormal in πΊ.
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