Codomain

In mathematics, a codomain or set of destination of a function is a set into which all of the output of the function is constrained to fall. It is the set $Y$ in the notation $f : X \to Y$ . The term range is sometimes ambiguously used to refer to either the codomain or the image of a function.

A codomain is part of a function $f$ if $f$ is defined as a triple $(X, Y, G)$ where $X$ is called the domain of $f$ , $Y$ its codomain, and $G$ its graph.^[1] The set of all elements of the form $f (x)$ , where $x$ ranges over the elements of the domain $X$ , is called the image of $f$ . The image of a function is a subset of its codomain so it might not coincide with it. Namely, a function that is not surjective has elements $y$ in its codomain for which the equation $f (x) = y$ does not have a solution.

A codomain is not part of a function $f$ if $f$ is defined as just a graph.^[2]^[3] For example in set theory it is desirable to permit the domain of a function to be a proper class $X$ , in which case there is formally no such thing as a triple $(X, Y, G)$ . With such a definition functions do not have a codomain, although some authors still use it informally after introducing a function in the form $f : X \to Y$ .^[4]

^ Bourbaki 1970, p. 76
^ Bourbaki 1970, p. 77
^ Forster 2003, pp. 10–11
^ Eccles 1997, p. 91 (quote 1, quote 2); Mac Lane 1998, p. 8; Mac Lane, in Scott & Jech 1967, p. 232; Sharma 2004, p. 91; Stewart & Tall 1977, p. 89

[1] Bourbaki 1970, p. 76

[2] Bourbaki 1970, p. 77

[3] Forster 2003, pp. 10–11

[4] Eccles 1997, p. 91 (quote 1, quote 2); Mac Lane 1998, p. 8; Mac Lane, in Scott & Jech 1967, p. 232; Sharma 2004, p. 91; Stewart & Tall 1977, p. 89

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