Ring Unit

algebra

Definition

Unit of a Ring

An element $a\in R$ of a ring $(R,+,\cdot )$ is called unit if there exists the multiplicative inverse $a^{-1}\in R$.

Example: $ac=bc$ with $a,b,c\in R$ and $c\in R^{\ast }$, hence $c^{-1}$ exists. Therefore, $ac{c}^{-1}=bc{c}^{-1}⟹a=b$.