Definition:Renaming Mapping

Definition
Let $f: S \to T$ be a mapping.

The renaming mapping $r: S / \RR_f \to \Img f$ is defined as:


 * $r: S / \RR_f \to \Img f: \map r {\eqclass x {\RR_f} } = \map f x$

where:
 * $\RR_f$ is the equivalence induced by the mapping $f$
 * $S / \RR_f$ is the quotient set of $S$ determined by $\RR_f$
 * $\eqclass x {\RR_f}$ is the equivalence class of $x$ under $\RR_f$.

Also known as
This mapping can also be seen referred to as the mapping on $S / \RR_f$ induced by $f$.

However, the term induced mapping is used so often throughout this area of mathematics that it would make sense to use a less-overused term whenever possible.

Also see

 * Condition for Mapping from Quotient Set to be Well-Defined
 * Renaming Mapping is Well-Defined
 * Renaming Mapping is Bijection


 * Quotient Theorem for Sets