Additive group of a field
Definition
Symbol-free definition
A group is termed the additive group of a field if it satisfies the following equivalent conditions:
- There exists a field whose additive group is isomorphic to the given group.
- There exists a vector space over a field whose additive group is isomorphic to the given group.
- The given group is an internal (restricted) direct product of copies of a cyclic group of prime order, or of the group of rational numbers.
- It is Abelian and characteristically simple.
- It is Abelian and FC-simple group|FC-simple]]: it has no proper nontrivial fully characteristic subgroup.
- It is Abelian, and its automorphism group is transitive on non-identity elements.
Equivalence of definitions
Further information: Abelian and FC-simple implies additive group of a field