Definition:Codomain (Set Theory)/Mapping

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

The codomain of $f$ is the set $T$.

It is denoted on by $\Cdm f$.

Also known as
The codomain of a mapping is sometimes called the arrival set.

On rare occasions, the codomain is referred to as the target.

Some sources write codomain as co-domain.

A note on terminology
Some sources refer to the codomain of a mapping as its range.

However, other sources equate the term range with the image set.

Other sources brush the question aside by refraining from giving the codomain a name at all.

For example, from : Notation and Terminology:


 * A map or function (the terms are used interchangeably) between sets $A, B$ is written $f: A \to B$. We call $A$ the domain of $f$, and we avoid calling $B$ anything.

As there exists significant ambiguity as to whether the range is to mean the codomain or image set, it is advised that the term range is not used.

The notation $\Cdm f$ has not actually been found by this author anywhere in the literature. In fact, except in the field of category theory, no symbol for the concept of codomain has been found, despite extensive searching.

However, using $\Cdm f$ to mean codomain is a useful enough shorthand to be worth coining. That is the approach which has been taken on this website.

Also see

 * Definition:Domain of Mapping
 * Definition:Range of Relation


 * Definition:Image Set of Mapping
 * Definition:Preimage of Mapping