Invertible element

This article defines a property of elements or tuples of elements with respect to a binary operation

Further information: inverse element

Definition

An element ${\displaystyle a}$ in a set ${\displaystyle S}$ with binary operation ${\displaystyle *}$ and neutral element ${\displaystyle e}$ is termed:

• left invertible if it has a left inverse, viz there exists an element ${\displaystyle b}$ such that ${\displaystyle b*a=e}$
• right invertible it it has a right inverse, viz there exists an element ${\displaystyle b}$ such that ${\displaystyle a*b=e}$
• invertible if it has a two-sided inverse

Note that we need to be particularly careful here. If an element possesses both a left inverse and a right inverse, that does not necessarily guarantee that the element possesses a two-sided inverse. The guarantee can, however, be given in the case of associativity. For full proof, refer: Inverse element#Equality of left and right inverses