Quotient-pullbackable equals inner

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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 σ of a group G is termed quotient-pullbackable if given any surjective homomorphism ρ:HG there is an automorphism φ of H such that ρφ=σρ.

Inner automorphism

Further information: Inner automorphism

An automorphism σ of a group G is termed an inner automorphism if there exists gG such that σ=cg=xgxg1.

Related facts

References