Difference between revisions of "Injection"
m (typo) |
(expanded) |
||
Line 1: | Line 1: | ||
+ | $ \def\Id {\mathop{\rm Id}} $ | ||
A function (or mapping) is called '''injective''' if distinct arguments have distinct images. | A function (or mapping) is called '''injective''' if distinct arguments have distinct images. | ||
− | |||
In other words, a function $ f : A \to B $ from a set $A$ to a set $B$ is | In other words, a function $ f : A \to B $ from a set $A$ to a set $B$ is | ||
− | : an '''injective function''' or an '''injection''' | + | : an '''injective function''' or an '''injection''' or '''one-to-one''' function |
if and only if | if and only if | ||
: $ a_1 \ne a_2 $ implies $ f(a_1) \ne f(a_2) $, or equivalently $ f(a_1) = f(a_2) $ implies $ a_1 = a_2 $ | : $ a_1 \ne a_2 $ implies $ f(a_1) \ne f(a_2) $, or equivalently $ f(a_1) = f(a_2) $ implies $ a_1 = a_2 $ | ||
for all $ a_1, a_2 \in A $. | for all $ a_1, a_2 \in A $. | ||
+ | |||
+ | ==== Equivalent conditions ==== | ||
+ | |||
+ | A function $f$ is injective if and only if | ||
+ | $ f^{-1}(f(S)) = S $ for all subsets $S$ of the domain $A$. | ||
+ | |||
+ | A function $f$ is injective if and only if, for every pair of functions $g,h$ with values in $A$, | ||
+ | the condition $ f \circ g = f \circ h $ implies $ g=h $. | ||
+ | (In category theory, this property is used to define ''monomorphisms''.) | ||
+ | |||
+ | A function $f$ is injective if and only if | ||
+ | there is a left-inverse function $g$ with $ g \circ f = \Id_A$. | ||
+ | ==== Related notions ==== | ||
+ | |||
A special case is the ''inclusion'' function defined on a subset $ A \subset B $ by $ f(a)=a $. | A special case is the ''inclusion'' function defined on a subset $ A \subset B $ by $ f(a)=a $. | ||
− | An injective [[homomorphism]] is called monomorphism. | + | An injective [[homomorphism]] is called ''monomorphism''. |
− | Injective mappings that are compatible with the underlying structure are often called [[embedding]]. | + | Injective mappings that are compatible with the underlying structure are often called ''[[embedding]]s''. |
− | A function that is both injective and [[Surjection|surjective]] is called [[Bijection|bijective]] | + | A function that is both injective and [[Surjection|surjective]] is called ''[[Bijection|bijective]]'' |
− | (or, if domain and range coincide, in some contexts, a [[permutation of a set|permutation]]) | + | (or, if domain and range coincide, in some contexts, a ''[[permutation of a set|permutation]])''. |
− | |||
− | |||
− |
Revision as of 11:03, 19 February 2012
$ \def\Id {\mathop{\rm Id}} $
A function (or mapping) is called injective if distinct arguments have distinct images.
In other words, a function $ f : A \to B $ from a set $A$ to a set $B$ is
- an injective function or an injection or one-to-one function
if and only if
- $ a_1 \ne a_2 $ implies $ f(a_1) \ne f(a_2) $, or equivalently $ f(a_1) = f(a_2) $ implies $ a_1 = a_2 $
for all $ a_1, a_2 \in A $.
Equivalent conditions
A function $f$ is injective if and only if $ f^{-1}(f(S)) = S $ for all subsets $S$ of the domain $A$.
A function $f$ is injective if and only if, for every pair of functions $g,h$ with values in $A$, the condition $ f \circ g = f \circ h $ implies $ g=h $. (In category theory, this property is used to define monomorphisms.)
A function $f$ is injective if and only if there is a left-inverse function $g$ with $ g \circ f = \Id_A$.
Related notions
A special case is the inclusion function defined on a subset $ A \subset B $ by $ f(a)=a $.
An injective homomorphism is called monomorphism.
Injective mappings that are compatible with the underlying structure are often called embeddings.
A function that is both injective and surjective is called bijective (or, if domain and range coincide, in some contexts, a permutation).
Injection. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Injection&oldid=21203