abelianization

As nouns the difference between terms and abelianization

is that terms is while abelianization is (mathematics) a homomorphism that transforms a group into an abelian group.

As nouns the difference between abelianisation and abelianization

is that abelianisation is while abelianization is (mathematics) a homomorphism that transforms a group into an abelian group.

As nouns the difference between taxonomy and abelianization

is that taxonomy is the science or the technique used to make a classification while abelianization is (mathematics) a homomorphism that transforms a group into an abelian group.

Abelianization is a related term of abelianized.

In mathematics|lang=en terms the difference between abelianization and abelianized

is that abelianization is (mathematics) a homomorphism that transforms a group into an abelian group while abelianized is (mathematics) transformed into an abelian group.

As a noun abelianization

is (mathematics) a homomorphism that transforms a group into an abelian group.

As an adjective abelianized is

(mathematics) transformed into an abelian group.

As a verb abelianized is

(abelianize).

In mathematics terms the difference between abelian and abelianization

is that abelian is having a commutative defining operation while abelianization is a homomorphism that transforms a group into an abelian group.

As an adjective abelian

is having a commutative defining operation.

As nouns the difference between group and abelianization

is that group is a number of things or persons being in some relation to one another while abelianization is (mathematics) a homomorphism that transforms a group into an abelian group.

As a verb group

is to put together to form a group.

As nouns the difference between homomorphism and abelianization

is that homomorphism is a structure-preserving map between two algebraic structures, such as groups, rings, or vector spaces while abelianization is a homomorphism that transforms a group into an abelian group.