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Context: I'm working on exercises in Software Foundations.

Theorem neg_move : forall x y : bool,
  x = negb y -> negb x = y.
Proof. Admitted.

Theorem evenb_n__oddb_Sn : forall n : nat,
  evenb n = negb (evenb (S n)).
Proof.
  intros n. induction n as [| n'].
  Case "n = 0".
    simpl. reflexivity.
  Case "n = S n'".
    rewrite -> neg_move.

Before the last line, my subgoal is this:

evenb (S n') = negb (evenb (S (S n')))

And I want to transform it into this:

negb (evenb (S n')) = evenb (S (S n'))

When I try to step through rewrite -> neg_move, however, it produces this error:

Error: Unable to find an instance for the variable y.

I'm sure this is really simple, but what am I doing wrong? (Please don't give anything away for solving evenb_n__oddb_Sn, unless I'm doing it completely wrong).

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The phrase "unable to find an instance for the variable y" means that Coq is unable to find a value to substitute for the variable y in the type of neg_move. You can solve this problem by explicitly instantiating the parameters of neg_move, including the antecedent of the conditional (which will be generated as a subgoal if left uninstantiated). However, conditional statements are generally meant to be applied; in fact, neg_move can be applied to your induction hypothesis to obtain a more useful hypothesis. –  danportin Jan 16 '12 at 5:31

1 Answer 1

up vote 6 down vote accepted

As danportin mentioned, Coq is telling you that it does not know how to instantiate y. Indeed, when you do rewrite -> neg_move, you ask it to replace some negb x by a y. Now, what y is Coq supposed to use here? It cannot figure it out.

One option is to instantiate y explicitly upon rewriting:

rewrite -> neg_move with (y:=some_term)

This will perform the rewrite and ask you to prove the premises, here it will add a subgoal of the form x = negb some_term.

Another option is to specialize neg_move upon rewriting:

rewrite -> (neg_move _ _ H)

Here H must be a term of type some_x = negb some_y. I put two wildcards for the x and the y parameters of neg_move since Coq is able to infer them from H as being some_x and some_y respectively. Coq will then try to rewrite an occurence of negb some_x in your goal with some_y. But you first need to get this H term in your hypotheses, which might be some additional burden...

(Note that the first option I gave you should be equivalent to rewrite -> (neg_move _ some_term))

Another option is erewrite -> negb_move, which will add uninstantiated variables that will look like ?x and ?y, and try to do the rewrite. You will then have to prove the premise, which will look like (evenb (S (S n'))) = negb ?y, and hopefully in the process of solving this subgoal, Coq will find out what ?y should have been from the start (there are some restrictions though, and some problems may arise is Coq solves the goal without figuring out what ?y must be).


However, for your particular problem, it is quite easier:

==========
evenb (S n') = negb (evenb (S (S n')))

symmetry.

==========
negb (evenb (S (S n'))) = evenb (S n')

apply neg_move.

==========
evenb (S (S n')) = negb (evenb (S n'))

And that's what you wanted (backwards, do another symmetry. if you care).

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