7

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 ?

5
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.
| improve this answer | |
  • 1
    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
1

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.
| improve this answer | |
  • 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
0

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.

| improve this answer | |

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