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
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