# Rewriting a match in Coq

In Coq, suppose I have a fixpoint function `f` whose matching definition on (`g x`), and I want to use a hypothesis in the form (`g x = ...`) in a proof. The following is a minimal working example (in reality `f`, `g` would be more complicated):

``````Definition g (x:nat) := x.

Fixpoint f (x:nat) :=
match g x with
| O => O
| S y => match x with
| O => S O
| S z => f z
end
end.

Lemma test : forall (x : nat), g x = O -> f x = O.
Proof.
intros.
unfold f.
rewrite H. (*fails*)
``````

The message shows where Coq gets stuck:

``````(fix f (x0 : nat) : nat :=
match g x0 with
| 0 => 0
| S _ => match x0 with
| 0 => 1
| S z0 => f z0
end
end) x = 0

Error: Found no subterm matching "g x" in the current goal.
``````

But, the commands `unfold f. rewrite H.` does not work.

How do I get Coq to `unfold f` and then use `H` ?

``````Parameter g: nat -> nat.

(* You could restructure f in one of two ways: *)

(* 1. Use a helper then prove an unrolling lemma: *)

Definition fhelp fhat (x:nat) :=
match g x with
| O => O
| S y => match x with
| O => S O
| S z => fhat z
end
end.

Fixpoint f (x:nat) := fhelp f x.

Lemma funroll : forall x, f x = fhelp f x.
destruct x; simpl; reflexivity.
Qed.

Lemma test : forall (x : nat), g x = O -> f x = O.
Proof.
intros.
rewrite funroll.
unfold fhelp.
rewrite H.
reflexivity.
Qed.

(* 2. Use Coq's "Function": *)

Function f2 (x:nat) :=
match g x with
| O => O
| S y => match x with
| O => S O
| S z => f2 z
end
end.

Check f2_equation.

Lemma test2 : forall (x : nat), g x = O -> f2 x = O.
Proof.
intros.
rewrite f2_equation.
rewrite H.
reflexivity.
Qed.
``````
• The issue is that Coq's `simpl` (and such like `unfold, cbv, ...`) usually are too eager to simplify and unfold too much. Stating the rewriting lemma exactly as you need (`funroll` here) with a really trivial proof, and using this lemma is a bit more complex, but yields better results in general. – Vinz Feb 9 '15 at 11:03

I'm not sure if this would solve the general problem, but in your particular case (since `g` is so simple), this works:

``````Lemma test : forall (x : nat), g x = O -> f x = O.
Proof.
unfold g.
intros ? H. rewrite H. reflexivity.
Qed.
``````
• From the question: "(in reality f, g would be more complicated)" – Anton Trunov Nov 19 '16 at 7:55
• Yes, I saw that now. But in all honesty, did the OP really submit a minimal working example? :-) – Olivier Verdier Nov 19 '16 at 15:16

Here is another solution, but of course for this trivial example. Perhaps will give you some idea. Lemma test2 : forall (x : nat), g x = O -> f x = O.
Proof.
=>intros;
pattern x;
unfold g in H;
rewrite H;
trivial.
Qed.