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ON THE σ-NILPOTENT NORM AND THE σ-NILPOTENT LENGTH OF A FINITE GROUP

Published online by Cambridge University Press:  27 February 2020

BIN HU
Affiliation:
School of Mathematics and Statistics, Jiangsu Normal University, Xuzhou, 221116, P.R. China e-mails: [email protected]; [email protected]
JIANHONG HUANG
Affiliation:
School of Mathematics and Statistics, Jiangsu Normal University, Xuzhou, 221116, P.R. China e-mails: [email protected]; [email protected]
ALEXANDER N. SKIBA
Affiliation:
Department of Mathematics and Technologies of Programming, Francisk Skorina Gomel State University, Gomel246019, Belarus e-mail: [email protected]

Abstract

Let G be a finite group and σ = {σi| iI} some partition of the set of all primes $\Bbb{P}$ . Then G is said to be: σ-primary if G is a σi-group for some i; σ-nilpotent if G = G1× … × Gt for some σ-primary groups G1, … , Gt; σ-soluble if every chief factor of G is σ-primary. We use $G^{{\mathfrak{N}}_{\sigma}}$ to denote the σ-nilpotent residual of G, that is, the intersection of all normal subgroups N of G with σ-nilpotent quotient G/N. If G is σ-soluble, then the σ-nilpotent length (denoted by lσ (G)) of G is the length of the shortest normal chain of G with σ-nilpotent factors. Let Nσ (G) be the intersection of the normalizers of the σ-nilpotent residuals of all subgroups of G, that is,

$${N_\sigma }(G) = \bigcap\limits_{H \le G} {{N_G}} ({H^{{_\sigma }}}).$$

Then the subgroup Nσ (G) is called the σ-nilpotent norm of G. We study the relationship of the σ-nilpotent length with the σ-nilpotent norm of G. In particular, we prove that the σ-nilpotent length of a σ-soluble group G is at most r (r > 1) if and only if lσ (G/ Nσ (G)) ≤ r.

Type
Research Article
Copyright
© The Author(s) 2020. Published by Cambridge University Press on behalf of Glasgow Mathematical Journal Trust

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References

REFERENCES

Robinson, D. J. S., A Course in the theory of groups (Springer-Verlag, New York, Heidelberg, Berlin, 1982).Google Scholar
Skiba, A. N., On σ-subnormal and σ-permutable subgroups of finite groups, J. Algebra, 436 (2015), 116.CrossRefGoogle Scholar
Guo, W. and Skiba, A. N., Finite groups whose n-maximal subgroups are σ-subnormal, Sci. China Math. 62(7) (2019), 13551372.Google Scholar
Skiba, A. N., Some characterizations of finite σ-soluble PσT-groups, J. Alg. 495(1) (2018), 114129.CrossRefGoogle Scholar
Doerk, K. and Hawkes, T., Finite soluble groups (Walter de Gruyter, Berlin, New York, 1992).CrossRefGoogle Scholar
Chunikhin, S. A., Subgroups of finite groups (Nauka i Tehnika, Minsk, 1964).Google Scholar
Guo, W. and Skiba, A. N., On σ-supersoluble groups and one generalization of CLT-groups, J. Alg. 512(1) (2018), 92108.CrossRefGoogle Scholar
Baer, R., Kern, Der, eine charkteristishe Untergruppe, Compos. Math. 1 (1935), 254283.Google Scholar
Baer, R., Norm and hypernorm, Publ. Math. Debrecen, 4 (1956), 347350.Google Scholar
Shen, Z., Shi, W. and Qian, G., On the norm of the nilpotent residuals of all subgroups of a finite group, J. Alg. 352 (2012), 290298.CrossRefGoogle Scholar
Selkin, V. M., On the π-decomposable norm of a finite group, Proceedings of Francisk Skorina Gomel State University 103(4) (2018), 5155.Google Scholar
Selkin, V. M. and Kosenok, N. S., On the generalized norm of a finite group, Problems Phys. Math. Tech. 34(4) (2018), 6974.Google Scholar
Ballester-Bolinches, A. and Ezquerro, L. M., Classes of finite groups (Springer, Dordrecht, 2006).Google Scholar
Hu, B., Huang, J. and Skiba, A. N., Characterizations of finite σ-nilpotent and σ-quasinilpotent groups, Bull. Malays. Math. Soc. 42(5) (2019), 20912104.Google Scholar
Su, N. and Wang, Y., On the normalizers of $\mathfrak{F}$ -residuals of all subgroups of a finite group, J. Alg. 392 (2013), 185198.CrossRefGoogle Scholar
Belonogov, V. A., Finite groups all of whose 2-maximal subgroups are π-decomposable, Trudi Instituta Matematiki i Mekhaniki Uro RAN 20(2) (2014), 2943.Google Scholar
Huppert, B., Endliche Gruppen I (Springer-Verlag, Berlin, Heidelberg, New York, 1967).CrossRefGoogle Scholar
Gorenstein, D., Finite groups (Harper & Row Publishers, New York, Evanston, London, 1968).Google Scholar
Shemetkov, L.A., Formations of finite groups (Nauka, Moscow, 1978).Google Scholar