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I'm working through the ListSet module from the Coq standard library. I'm unsure how to reason about conditionals in a proof. For instance, I am having trouble with the following proof. Definitions are provided for context.

Fixpoint set_mem (x : A) (xs : set) : bool :=
match xs with
  | nil       => false
  | cons y ys =>
      match Aeq_dec x y with
        | left  _ => true
        | right _ => set_mem x ys

Definition set_In : A -> set -> Prop := In (A := A).

Lemma set_mem_correct1 : forall (x : A) (xs : set),
  set_mem x xs = true -> set_In x xs.
Proof. intros. induction xs.
  simpl; destruct Aeq_dec with a x.
    simpl in H.

The current proof state includes the inr of Aeq_dec as a hypothesis. I have discarded the base case of induction and the inductive case where the inl of Aeq_dec is true.

  A : Type
  Aeq_dec : forall x y : A, {x = y} + {x <> y}
  x : A
  a : A
  xs : list A
  H : (if Aeq_dec x a then true else set_mem x xs) = true
  IHxs : set_mem x xs = true -> set_In x xs
  n : a <> x
   a = x \/ set_In x xs

The only way for H to be true if a <> x is if set_mem xs is true. I should be able to apply the conditional in H to a <> x in order to obtain set_mem xs. However, I don't understand how to do this. How do I deal with, or decompose, or apply conditionals?

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1 Answer 1

up vote 2 down vote accepted

Have you tried this? (syntax may be buggy, no coqtop here atm)

destruct (Aeq_dec x a);
[ subst; elim (n eq_refl)
| right; apply (IHxs H)

(if <foo> is more or less the same as match <foo> with. You'll have to reduce (destruct, case, ...) such that the match can be decided (or for the if, things must reduce to either the first or the second constructor of whatever type you're using it with.) Most of the time, you'll need the value that gets case-analyzed (though not here). If you need it, do a remember (<value>) as foo; destruct foo instead of destructing directly.)

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I believe I that I understand. The tactic destruct (Aeq_dec) destructs the sum inside H, generating two subgoals for the left and right branches of the sum. The first case generates contradictory hypotheses and is trivial; the second introduces the antecedent of the induction hypothesis. I didn't realize that I could destruct a sum nested inside a hypothesis. Thank you for pointing this out. –  danportin Oct 30 '11 at 18:06

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