An elementary approach for a description of the Fitting subgroup and soluble radical of a finite group G

Authors

  • Marcello Fidelis Universidade Federal Rural do Rio de Janeiro (UFRRJ), Departamento de Tecnologias e Linguagens, Instituto Multidisciplinar, Nova Iguaçu, RJ, Brasil https://orcid.org/0000-0003-3815-7559
  • José Roger de Oliveira Gomes Universidade Federal Rural do Rio de Janeiro (UFRRJ), Departamento de Tecnologias e Linguagens, Instituto Multidisciplinar, Nova Iguaçu, RJ, Brasil https://orcid.org/0000-0002-0062-4898

DOI:

https://doi.org/10.35819/remat2021v7i2id5193

Keywords:

Group, Nilpotent Groups, Soluble Groups, Fitting Subgroup, Soluble Radical

Abstract

This work presents an approach that prioritizes the use of Isomorphism Theorems of Groups to study soluble groups and nilpotent groups, which aim to describe the soluble radical S(G) of a finite group G as the largest normal solvable subgroup of G and the Fitting subgroup F(G) of a finite group G as the largest normal nilpotent subgroup of a finite group G. As an application, we show that this description allow us to verify whether S(G) and F(G) are examples of a subgroup class defined in Deaconescu and Walls (2011) for which there is a generalization of a classic result that relates a group G with its automorphism group Aut(G).

Downloads

Download data is not yet available.

Author Biographies

  • Marcello Fidelis, Universidade Federal Rural do Rio de Janeiro (UFRRJ), Departamento de Tecnologias e Linguagens, Instituto Multidisciplinar, Nova Iguaçu, RJ, Brasil
  • José Roger de Oliveira Gomes, Universidade Federal Rural do Rio de Janeiro (UFRRJ), Departamento de Tecnologias e Linguagens, Instituto Multidisciplinar, Nova Iguaçu, RJ, Brasil

References

BURNSIDE, W. The Theory of Groups of Finite Order. 2. ed. Cambridge: Cambridge University Press, 1911.

CONRAD, B. Solvable and nilpotent groups. Notas de aula. [2011]. Disponível em: http://math.stanford.edu/~conrad/210BPage/handouts/SOLVandNILgroups.pdf. Acesso em: 12 ago. 2020.

CONRAD, K. Subgroup series II. Notas de aula. [entre 2015 e 2020]. Disponível em: https://kconrad.math.uconn.edu/blurbs/grouptheory/subgpseries2.pdf. Acesso em: 14 ago. 2020.

DEACONESCU, M.; WALLS, G. L. On the group of automorphisms of a group. The American Matemathical Monthly, v. 118, n. 5, p. 452-455, maio 2011.

GALLIAN, J. A. Contemporary Abstract Algebra. 8. ed. Boston: Cengage Learning, 2013.

GARCIA, A.; LEQUAIN, Y. Elementos de Álgebra. Rio de Janeiro: IMPA, 2001.

GOMES, J. R. O. Grupos de Automorfismos de Grupos. Orientador: Marcello Fidélis. 2021. 34f. Monografia (Conclusão de Curso de Licenciatura em Matemática) - Departamento de Tecnologias e Linguagens, Instituto Multidisciplinar, Universidade Federal Rural do Rio de Janeiro, Nova Iguaçu, RJ, 2021.

HALL Jr., M. The Theory of Groups. New York: The Macmillan Company, 1959.

ROTMAN, J. J. Galois Theory. New York: Springer-Verlag, 1990.

ZASSENHAUS, H. The Thery of Groups. New York: Chelsea Publishing Company, 1949.

Published

2021-12-15

Issue

Section

Mathematics

How to Cite

FIDELIS, Marcello; GOMES, José Roger de Oliveira. An elementary approach for a description of the Fitting subgroup and soluble radical of a finite group G. REMAT: Revista Eletrônica da Matemática, Bento Gonçalves, RS, Brasil, v. 7, n. 2, p. e3005, 2021. DOI: 10.35819/remat2021v7i2id5193. Disponível em: https://periodicos.ifrs.edu.br/index.php/REMAT/article/view/5193.. Acesso em: 22 nov. 2024.

Similar Articles

11-20 of 308

You may also start an advanced similarity search for this article.