Manuals/calci/ACKERMANN

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ACKERMANN(m,n)

$m$ and $n$ are the positive integers.

Description

The Ackermann function is a classic example of a recursive function, notable especially because it is not a primitive recursive function.
All primitive recursive functions are total and computable, but the Ackermann function illustrates that not all total computable functions are primitive recursive.
Its arguments are never negative and it always terminates.
The two-argument Ackermann–Péter function, is defined as follows:

$A(m,n)={\begin{cases}n+1{\mbox{if}}m=0\\A(m-1,1)&{\mbox{if}}m>0andn=0\\A(m-1,A(m,n-1))&{\mbox{if}}m>0andn>0\end{cases}}$ \\

for nonnegative integers m and n.

Its value grows rapidly, even for small inputs.

Example

Related Videos

Ackermann

See Also

List of Main Z Functions

Z3 home

References

Ackermann Function

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