Quotient-pullbackable equals inner
This article gives the statement and possibly, proof, of an implication relation between two automorphism properties. That is, it states that every automorphism satisfying the first automorphism property (i.e., quotient-pullbackable automorphism) must also satisfy the second automorphism property (i.e., inner automorphism)
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Statement
Any quotient-pullbackable automorphism of a group is an inner automorphism.
Definitions used
Quotient-pullbackable automorphism
Further information: Quotient-pullbackable automorphism
An automorphism of a group is termed quotient-pullbackable if given any surjective homomorphism there is an automorphism of such that .
Inner automorphism
Further information: Inner automorphism
An automorphism of a group is termed an inner automorphism if there exists such that .
Related facts
References
- Characterizing inner automorphisms of groups by Martin R. Pettet, Archiv der Mathematik, ISSN 1420-8938 (Online), ISSN 0003-889X (Print), Volume 55,Number 5, Page 422 - 428(Year 1990): Springerlink official copyMore info