Error in defining Ackermann in Coq

I am trying to define the Ackermann-Peters function in Coq, and I'm getting an error message that I don't understand. As you can see, I'm packaging the arguments `a, b` of Ackermann in a pair `ab`; I provide an ordering defining an ordering function for the arguments. Then I use the `Function` form to define Ackermann itself, providing it with the ordering function for the `ab` argument.

``````Require Import Recdef.
Definition ack_ordering (ab1 ab2 : nat * nat) :=
match (ab1, ab2) with
|((a1, b1), (a2, b2)) =>
(a1 > a2) \/ ((a1 = a2) /\ (b1 > b2))
end.
Function ack (ab : nat * nat) {wf ack_ordering} : nat :=
match ab with
| (0, b) => b + 1
| (a, 0) => ack (a-1, 1)
| (a, b) => ack (a-1, ack (a, b-1))
end.
``````

What I get is the following error message:

``````Error: No such section variable or assumption: ack.
``````

I'm not sure what bothers Coq, but searching the internet, I found a suggestion there may be a problem with using a recursive function defined with an ordering or a measure, where the recursive call occurs within a match. However, using the projections `fst` and `snd` and an `if-then-else` generated a different error message. Can someone please suggest how to define Ackermann in Coq?

Thanks,

Mayer

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I ran into the same problem today. Did you find a solution? –  Abhishek Jun 27 at 6:33

You get this error because you are referencing the `ack` function while you are defining it. Self reference is only allowed in `Fixpoint`s (ie. recursive functions) but the problem is, as you probably know, that the Ackermann function is not a primitive recursive function.

So one alternative way to define it is by inlining a second recursive function that is structurally recursive for the second argument; so something like

``````Fixpoint ack (n m : nat) : nat :=
match n with
| O => S m
| S p => let fix ackn (m : nat) :=
match m with
| O => ack p 1
| S q => ack p (ackn q)
end
in ackn m
end.
``````
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I wasn't using Fixpoint, but Function. This is supposed to work with total functions that have a decreasing argument, and I should be able to do so using either a measure or a comparison, followed by a theorem that arguments in recursive calls either have a smaller measure or are less than the original arguments, as per the comparator. I know Ackermann is 2nd-order PR, but obviously the PR status of the function didn't prevent you from encoding it in some way. What I'm wondering about is what is wrong with the encoding I gave, which seems to follow the description in the manual. –  Mayer Goldberg Apr 24 '12 at 18:30

I just tried your function with Coq 8.4, and the error is slightly different:

``````Error: Nested recursive function are not allowed with Function
``````

I guess the inner call to ack is the problem, but I don't know why.

Hope this helps a bit, V.

PS: The usual way I define Ack is what wires wrote, with an inner fixpoint.

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