Some Notes on Relative Commutators

Ganjali, Masoumeh; Erfanian, Ahmad

doi:10.15408/inprime.v2i2.14482

Cited by 2 publications

(1 citation statement)

References 2 publications

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“…Further results and wider study based on the 𝛼-normal subgroup can be found in Read (1976), Mazur (1994), Barzegar (2015), Kumar (2019), Ganjali & Erfanian (2020), Haghparast et. al., (2021), Haghparast et.…”

Section: Introductionmentioning

confidence: 91%

A Note on Relative Normal Subgroups

Mahatma,

Hadi,

Sekti

2023

J. Eurekamatika

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Let G be finite group and α∈Aut(G). In 2016, Ganjali and Erfanian introduced the notion of a normal subgroup of G which is relative to α, called the α-normal subgroup. In detail, N is an α-normal subgroup of G if for every g∈G and n∈N we have g^(-1) nα(g)∈N. In this research, we show that if N is an α-normal subgroup of G and τ∈Aut(G) then N is τ-normal in G if and only if α(g)τ(g^(-1) )∈N for every g∈G.Keywords: Group, Normal subgroup, α-normal subgroup.AbstrakMisalkan G grup hingga dan α∈Aut(G). Tahun 2016, Ganjali dan Erfanian memperkenalkan ide tentang suatu subgrup normal dari G relatif terhadap α, dinamakan subgrup normal-α. Secara rinci, N adalah suatu subgrup normal-α dari G apabila untuk setiap g∈G dan n∈N berlaku g^(-1) nα(g)∈N. Dalam penelitian ini diperlihatkan bahwa jika N adalah suatu subgrup normal-α dari G dan τ∈Aut(G) maka N normal-τ di G jika dan hanya jika α(g)τ(g^(-1) )∈N untuk setiap g∈G.

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Section: Introductionmentioning

confidence: 91%

A Note on Relative Normal Subgroups

Mahatma,

Hadi,

Sekti

2023

J. Eurekamatika

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Relation between the left and right cosets of an α-normal subgroup

Mahatma

Hadi

Sudarwanto

2021

J. Phys.: Conf. Ser.

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Let G be a group and α be an automorphism of G. In 2016, Ganjali and Erfanian introduced the notion of a normal subgroup related to α, called the α-normal subgroup. It is basically known that if N is an ordinary normal subgroup of G then every right coset Ng is actually the left coset gN. This fact allows us to define the product of two right cosets naturally, thus inducing the quotient group. This research investigates the relation between the left and right cosets of the relative normal subgroup. As we have done in the classic version, we then define the product of two right cosets in a natural way and continue with the construction of a, say, relative quotient group.

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Some Notes on Relative Commutators

Cited by 2 publications

References 2 publications

A Note on Relative Normal Subgroups

A Note on Relative Normal Subgroups

Relation between the left and right cosets of an α-normal subgroup

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