# Proving commutativity of max in coq

I have a function `max`:

``````Fixpoint max (n : nat) (m : nat) : nat :=
match n, m with
| O, O => O
| O, S x => S x
| S x, O => S x
| S x, S y => S (max x y)
end.
``````

and a proof of the commutativity of `max` as follows:

``````Theorem max_comm :
forall n m : nat, max n m = max m n.
Proof.
intros n m.
induction n as [|n'];
induction m as [|m'];
simpl; trivial.
(* Qed. *)
``````

This leaves off at `S (max n' m') = S (max m' n')`, which seems correct, and given the base case has already been proven, seems like one should be able to tell coq "just use the recursion!". However, I cannot figure out how to do it. Any help?

-

The problem is you introduce variable `m` before doing induction on variable `n`, and that makes the induction hypothesis less general. Try this instead.
``````intro n; induction n as [| n' IHn'];
Walking through the cases, it now makes a lot more sense as to why one would `destruct m` instead of `induction m`. Thanks! –  Alex Miller Jan 19 '13 at 16:31