Class-preserving implies linearly extensible
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 must also satisfy the second automorphism property
View all automorphism property implications | View all automorphism property non-implications
|
Property "Page" (as page type) with input value "{{{stronger}}}" contains invalid characters or is incomplete and therefore can cause unexpected results during a query or annotation process.Property "Page" (as page type) with input value "{{{weaker}}}" contains invalid characters or is incomplete and therefore can cause unexpected results during a query or annotation process.
Definition
Let be a group, and a class-determining field for it. Then, any class-preserving automorphism of is linearly extensible.
Proof
The proof combines two facts:
- Class-preserving implies linearly pushforwardable: This is the crux of the proof, and uses that the field is class-determining for the group.
- Linearly pushforwardable implies linearly extensible: This is tautological.