ryhmäkertolasku

Ryhmäkertolasku, also known as group multiplication or sometimes abstract multiplication, is a concept that extends the notion of multiplication beyond simple numbers to abstract algebraic structures. In essence, it deals with the operation of combining elements within a group, where a group is a set equipped with a binary operation that satisfies certain axioms: closure, associativity, the existence of an identity element, and the existence of an inverse element for each element in the set.

When we speak of ryhmäkertolasku, we are referring to the group operation itself. For example, in the

The properties of ryhmäkertolasku are dictated by the axioms of the group. It is associative, meaning that