# On $n^{th}$ class preserving automorphisms of $n$-isoclinism family

**Authors:** Surjeet Kour

arXiv: 1701.05438 · 2017-01-20

## TL;DR

This paper explores the structure of automorphisms that preserve certain classes in finite groups, establishing isomorphisms between automorphism groups of $n$-isoclinic groups and relating them to inner automorphisms under specific conditions.

## Contribution

It demonstrates that automorphism groups preserving $n$-th class structures are isomorphic for $n$-isoclinic groups and connects these automorphisms to inner automorphisms in nilpotent groups.

## Key findings

- Isomorphism between automorphism groups of $n$-isoclinic groups.
- Characterization of $n$-th class preserving automorphisms.
- Relation of automorphism groups to inner automorphisms in nilpotent groups.

## Abstract

Let $G$ be a finite group and $M,N$ be two normal subgroups of $G$. Let $Aut_N^M(G)$ denote the group of all automorphisms of $G$ which fix $N$ element wise and act trivially on $G/M$. Let $n$ be a positive integer. In this article we have shown that if $G$ and $H$ are two $n$-isoclinic groups, then there exists an isomorphism from $Aut_{Z_n(G)}^{\gamma_{n+1}(G)}(G)$ to $Aut_{Z_n(H)}^{\gamma_{n+1}(H)}(H)$, which maps the group of $n^{th}$ class preserving automorphisms of $G$ to the group of $n^{th}$ class preserving automorphisms of $H$. Also, for a nilpotent group of class at most $(n+1)$, with some suitable conditions on $\gamma_{n+1}(G)$, we prove that $Aut_{Z_n(G)}^{\gamma_{n+1}(G)}(G)$ is isomorphic to the group of inner automorphisms of a quotient group of $G$.

## Full text

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## References

7 references — full list in the complete paper: https://tomesphere.com/paper/1701.05438/full.md

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Source: https://tomesphere.com/paper/1701.05438