abelisering

Abelisering is a term used in abstract algebra to describe the process of modifying a non-abelian group or ring to make it abelian. This is often achieved by introducing a new multiplication operation that is commutative. For example, given a group G with multiplication operation *, one might define a new operation ° such that a ° b = a * b * b⁻¹ * a⁻¹. This new operation ° often results in an abelian group, meaning that a ° b = b ° a for all elements a and b in the set.

The concept of abelisering is particularly relevant when studying the structure of non-abelian groups. By abelizing

In the context of rings, abelizing can involve constructing a new ring where the multiplication is commutative.