Implications of the Index of a Fixed Point Subgroup
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Date
2019
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C E D A M Spa Casa Editr Dott Antonio Milani
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GOLD
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Abstract
Let G be a finite group and A <= Aut(G). The index vertical bar G:C-G(A)vertical bar is called the index of A in G and is denoted by Ind(G)(A). In this paper, we study the influence of Ind(G)(A) on the structure of G and prove that [G, A] is solvable in case where A is cyclic, Ind G(A) is squarefree and the orders of G and A are coprime. Moreover, for arbitrary A <= Aut(G) whose order is coprime to the order of G, we show that when [G, A] is solvable, the Fitting height of [G, A] is bounded above by the number of primes (counted with multiplicities) dividing Ind(G)(A) and this bound is best possible.
Description
Keywords
Index, Fixed Point Subgroup, Automorphism Of A Group, Solvable Group, Fitting Height, index, automorphism of a group, Fitting height, fixed point subgroup, Finite solvable groups, theory of formations, Schunck classes, Fitting classes, \(\pi\)-length, ranks, Arithmetic and combinatorial problems involving abstract finite groups, Automorphisms of abstract finite groups, solvable group
Fields of Science
0101 mathematics, 01 natural sciences
Citation
Turkan, Erkan Murat, "Implications of the index of a fixed point subgroup", Rendiconti Del Seminario Matematico Della Universita Di Padova", Rendiconti Del Seminario Matematico Della Universita Di Padova, Vol. 142, pp. 1-7, (2019).
WoS Q
Q3
Scopus Q
Q4
OpenCitations Citation Count
N/A
Source
Rendiconti del Seminario Matematico della Università di Padova
Volume
142
Issue
Start Page
1
End Page
7
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