# How do I reason about conditionals in Coq?

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
end
end.

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.
discriminate.
simpl; destruct Aeq_dec with a x.
intuition.
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?

-

``````destruct (Aeq_dec x a);
(`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.)
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