阿克曼函数：修订间差异

阿克曼函数(Ackermann function)是由德国数学家 Wilhelm Ackermann 创造的非原始递归函数，后来由 Rozsa Peter 和 Raphael M. Robinson 简化。阿克曼函数的确切定义因作者而异。

Robinson 的版本^[1]是最常被使用的 Ackermann 函数：

${\displaystyle A(m,n)=\{\begin{array}{ll}n+1& ,m=0\\ A(m-1,1)& ,m\ne 0\wedge n=0\\ A(m-1,A(m,n-1))& ,m\ne 0\wedge n\ne 0\end{array}}$

在这个定义下，${\displaystyle A(x,y)=2{\uparrow }^{x-2}(y+3)-3}$，它的 FGH 增长率约为 ${\displaystyle \omega }$。

示例

${\displaystyle \begin{array}{lll}A(2,2)& =& A(1,A(2,1))\\ & =& A(1,A(1,A(2,0)))& & \\ & =& A(1,A(1,A(1,1)))\\ & =& A(1,A(1,A(0,A(1,0))))\\ & =& A(1,A(1,A(0,A(0,1))))\\ & =& A(1,A(1,A(0,2)))\\ & =& A(1,A(1,3))\\ & =& A(1,A(0,A(1,2)))\\ & =& A(1,A(0,A(0,A(1,1))))\\ & =& A(1,A(0,A(0,A(0,A(1,0)))))\\ & =& A(1,A(0,A(0,A(0,A(0,1)))))\\ & =& A(1,A(0,A(0,A(0,2))))\\ & =& A(1,A(0,A(0,3)))\\ & =& A(1,A(0,4))\\ & =& A(1,5)\\ & =& A(0,A(1,4))\\ & =& A(0,A(0,A(1,3)))\\ & =& A(0,A(0,A(0,A(1,2))))\\ & =& A(0,A(0,A(0,A(0,A(1,1)))))\\ & =& A(0,A(0,A(0,A(0,A(0,A(1,0))))))\\ & =& A(0,A(0,A(0,A(0,A(0,A(0,1))))))\\ & =& A(0,A(0,A(0,A(0,A(0,2)))))\\ & =& A(0,A(0,A(0,A(0,3))))\\ & =& A(0,A(0,A(0,4)))\\ & =& A(0,A(0,5))\\ & =& A(0,6)\\ & =& 7\end{array}}$

函数值表

原始定义

${\displaystyle A(n,x,y)=\{\begin{array}{ll}x+y& ,n=0\\ \underset{y\text{ times}}{\underbrace{A(n-1,A(\cdots (A(n-1,x))\cdots ))}}& ,n\ne 0\end{array}}$

它可以用上箭头表示法表示为 ${\displaystyle A(n,x,y)=x{\uparrow }^{n-2}y}$，但是在它被定义前上箭头表示法还未被发明。它是根据高阶原始递归（即函数上的原始递归）定义的。^[2]

Friedman 的定义

${\displaystyle A(x,y)=\{\begin{array}{ll}2& ,y=1\\ 2y& ,x=1\wedge y>1\\ A(x-1,A(x,y-1))& ,x>1\wedge y>1\end{array}}$

在这个定义下，${\displaystyle A(x,y)=2{\uparrow }^{x-1}y}$。^[3]

定义在 R^* 上的 Ackermann 函数

CompactStar 的定义：^[4]

${\displaystyle A(x,y)=\{\begin{array}{ll}x+y+1& ,x<1\\ A(x-1,y\cdot A(x-1,1)-y+1)& ,x⩾1\wedge y<1\\ A(x-1,A(x,y-1))& ,x⩾1\wedge y⩾1\end{array}}$

Ackermann 函数和 Ackermann 数

数列 ${\displaystyle A_n=A(n+2,n,n)}$（使用原始定义）被称为 Ackermann 数，^[5]这里 ${\displaystyle A_n=n{\uparrow }^{n}n}$。