# Uses of Ackermann function?

In our discrete mathematics course in my university, the teacher shows his students the Ackermann function and assign the student to develop the function on paper.

Beside being a benchmark for recursion optimisation, does the Ackermann function has any real uses ?

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Yes. The (inverse) Ackermann function appears in complexity analysis of algorithms. When it does, it means you can almost ignore that term since it grows so slowly (a lot like log(log ... log(n)...)) i.e. lg*(n). For example: Minimum Spanning Trees (also here) and Disjoint Set forest construction.

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Specifically the union find algorithm if you want an example. yucs.org/~gnivasch/alpha/index.html –  Joshua Sep 14 '09 at 23:11
But it's the inverse of the function, what about the real function ? –  Michaël Larouche Sep 14 '09 at 23:22

The original "use" of the Ackermann function was to show that there are functions which are not primitive recursive, i.e. which cannot be computed by using only for loops with predetermined upper limits.

The Ackermann function is such a function, it grows too fast to be primitive recursive.

I don't think there are really practical uses, it grows too fast to be useful. You can't even explicitly represent the numbers beyond a(4,3) in a reasonable space.

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