數學 中,一個由集合X {\displaystyle X} Y {\displaystyle Y} 函數 ,若對每一在Y {\displaystyle Y} y {\displaystyle y} X {\displaystyle X} x {\displaystyle x} X {\displaystyle X} x {\displaystyle x} Y {\displaystyle Y} y {\displaystyle y} 對射函數 。
換句話說,如果其為兩集合間的一一對應 ,则f {\displaystyle f}
例如,由整數 集合Z {\displaystyle \mathbb {Z} } Z {\displaystyle \mathbb {Z} } succ {\displaystyle \operatorname {succ} } x {\displaystyle x} succ ( x ) = x + 1 {\displaystyle \operatorname {succ} (x)=x+1} sumdif {\displaystyle \operatorname {sumdif} } ( x , y ) {\displaystyle (x,y)} sumdif ( x , y ) = ( x + y , x − y ) {\displaystyle \operatorname {sumdif} (x,y)=(x+y,x-y)}
一雙射函數亦簡稱為雙射 (英語:bijection )或置換 。後者一般較常使用在X = Y {\displaystyle X=Y} X {\displaystyle X} Y {\displaystyle Y} X ↔ Y {\displaystyle X\leftrightarrow Y}
雙射函數在許多數學領域扮演著很基本的角色,如在同構的定義(以及如同胚和微分同構等相關概念)、置換群、投影映射及許多其他概念的基本上。
一函數f {\displaystyle f} f − 1 {\displaystyle f^{-1}} f − 1 {\displaystyle f^{-1}}
兩個雙射函數f : X ↔ Y {\displaystyle f:X\leftrightarrow Y} g : Y ↔ Z {\displaystyle g:Y\leftrightarrow Z} g ∘ f {\displaystyle g\circ f} ( g ∘ f ) − 1 = ( f − 1 ) ∘ ( g − 1 ) {\displaystyle (g\circ f)^{-1}=(f^{-1})\circ (g^{-1})}
另一方面,若g ∘ f {\displaystyle g\circ f} f {\displaystyle f} g {\displaystyle g}
一由X {\displaystyle X} Y {\displaystyle Y} f {\displaystyle f} Y {\displaystyle Y} X {\displaystyle X} g {\displaystyle g} g ∘ f {\displaystyle g\circ f} X {\displaystyle X} f ∘ g {\displaystyle f\circ g} Y {\displaystyle Y}
若X {\displaystyle X} Y {\displaystyle Y} 若且唯若 兩個集合有相同的元素個數。確實,在公理集合論裡,這正是「相同元素個數」的定義 ,且廣義化至無限集合,並導致了基數的概念,用以分辨無限集合的不同大小。
對任一集合X {\displaystyle X} 函數f : R → R {\displaystyle f:\mathbb {R} \rightarrow \mathbb {R} } f ( x ) = 2 x + 1 {\displaystyle f(x)=2x+1} y {\displaystyle y} x = ( y − 1 ) / 2 {\displaystyle x=(y-1)/2} f ( x ) = y {\displaystyle f(x)=y} 指數函數g : R → R {\displaystyle g:\mathbb {R} \rightarrow \mathbb {R} } g ( x ) = e x {\displaystyle g(x)=e^{x}} R {\displaystyle \mathbb {R} } x {\displaystyle x} g ( x ) = − 1 {\displaystyle g(x)=-1} g {\displaystyle g} R + = ( 0 , + ∞ ) {\displaystyle \mathbb {R} ^{+}=(0,+\infty )} g {\displaystyle g} ln {\displaystyle \ln } 函數h {\displaystyle h} R → [ 0 , + ∞ ) {\displaystyle \mathbb {R} \rightarrow [0,+\infty )} h ( x ) = x 2 {\displaystyle h(x)=x^{2}} h ( − 1 ) = h ( 1 ) = 1 {\displaystyle h(-1)=h(1)=1} h {\displaystyle h} [ 0 , + ∞ ) {\displaystyle [0,+\infty )} h {\displaystyle h} R → R : x ↦ ( x − 1 ) x ( x + 1 ) = x 3 − x {\displaystyle \mathbb {R} \to \mathbb {R} :x\mapsto (x-1)x(x+1)=x^{3}-x} − 1 , 0 {\displaystyle -1,0} 1 {\displaystyle 1} 0 {\displaystyle 0} R → [ − 1 , 1 ] : x ↦ sin ( x ) {\displaystyle \mathbb {R} \to [-1,1]:x\mapsto \sin(x)} π / 3 {\displaystyle \pi /3} π / 3 {\displaystyle \pi /3} 3 / 2 {\displaystyle {\sqrt {3}}/2}
一由實數 R {\displaystyle \mathbb {R} } R {\displaystyle \mathbb {R} } f {\displaystyle f} 設X {\displaystyle X} X {\displaystyle X} ∘ {\displaystyle \circ } X {\displaystyle X} S ( X ) {\displaystyle {\mathfrak {S}}(X)} S X {\displaystyle {\mathfrak {S}}_{X}} X ! {\displaystyle X!} 取一定義域的子集A {\displaystyle A} B {\displaystyle B} | f ( A ) | = | A | {\displaystyle |f(A)|=|A|} | f − 1 ( B ) | = | B | {\displaystyle |f^{-1}(B)|=|B|} 若X {\displaystyle X} Y {\displaystyle Y} f : X → Y {\displaystyle f:X\to Y} f {\displaystyle f} f {\displaystyle f} f {\displaystyle f} 一个严格的单调函数是双射函数,但双射函数不一定是单调函数(例如y = x − 3 {\displaystyle y=x^{-3}}
等势 單射 同構 置換 對稱群 满射 雙射計數法 水平线测试
Bijection, 数学百科全书, EMS Press, 2001 (英语) 埃里克·韦斯坦因. Bijection. MathWorld. Earliest Uses of Some of the Words of Mathematics: entry on Injection, Surjection and Bijection has the history of Injection and related terms.(页面存档备份,存于互联网档案馆 )