Class-preserving automorphism

This article defines a term that has been used or referenced in a journal article or standard publication, but may not be generally accepted by the mathematical community as a standard term.[SHOW MORE]

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This article defines an automorphism property, viz a property of group automorphisms. Hence, it also defines a function property (property of functions from a group to itself)
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Definition

An automorphism of a group is termed a class-preserving automorphism or class automorphism if it takes each element to within its conjugacy class. In symbols, an automorphism ${\displaystyle \sigma }$ of a group ${\displaystyle G}$ is termed a class automorphism or class-preserving automorphism if for every ${\displaystyle g}$ in ${\displaystyle G}$, there exists an element ${\displaystyle h}$ such that ${\displaystyle \sigma (g)=hg{h}^{-1}}$. The choice of ${\displaystyle h}$ may depend on ${\displaystyle g}$.

Relation with other properties

Stronger properties

Weaker properties

Related properties

• Subgroup-conjugating automorphism: Further information: Class-preserving not implies subgroup-conjugating, Subgroup-conjugating not implies class-preserving
• Class-inverting automorphism

Facts

• Class-preserving automorphism group of finite p-group is p-group

Metaproperties

Group-closedness

This automorphism property is group-closed: it is closed under the group operations on automorphisms (composition, inversion and the identity map). It follows that the subgroup comprising automorphisms with this property, is a normal subgroup of the automorphism group
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Clearly, a product of class automorphisms is a class automorphism, and the inverse of a class automorphism is a class automorphism. Thus, the class automorphisms form a group which sits as a subgroup of the automorphism group. Moreover, this subgroup contains the group of inner automorphisms, and is a normal subgroup inside the automorphism group.

Direct product-closedness

This automorphism property is direct product-closed
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Let ${\displaystyle G_1}$ and ${\displaystyle G_2}$ be groups and ${\displaystyle {\sigma }_1,{\sigma }_2}$ be class automorphisms of ${\displaystyle G_1,G_2}$ respectively. Then, ${\displaystyle {\sigma }_1\times {\sigma }_2}$ is a class automorphism of ${\displaystyle G_1\times G_2}$.

Here, ${\displaystyle {\sigma }_1\times {\sigma }_2}$ is the automorphism of ${\displaystyle G_1\times G_2}$ that acts as ${\displaystyle {\sigma }_1}$ on the first coordinate and ${\displaystyle {\sigma }_2}$ on the second.

References

• On the outer automorphisms of a group by William Burnside, Proceedings of the London Mathematical Society, ISSN 1460244X (online), ISSN 00246115 (print), Volume 11, (Year 1913): ^{More info}
• Finite groups with class-preserving outer automorphisms by G. E. Wall, Journal of the London Mathematical Society, ISSN 14697750 (online), ISSN 00246107 (print), Page 315 - 320(Year 1947): ^{More info}
• Class-preserving automorphisms of finite groups by Martin Hertweck, Journal of Algebra, Volume 241, Issue 1, 1 July 2001, Pages 1-26^{More info}
• Class-preserving automorphisms of finite p-groups by Manoj K. Yadav, Journal of the London Mathematical Society, 2007, Page 755-772^{More info}

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