This is a really elementary question, and I apologize, but I've been trying to use Coq to prove the following theorem, and just can't seem to figure out how to do it.
(* Binary tree definition. *) Inductive btree : Type := | EmptyTree | Node : btree -> btree -> btree. (* Checks if two trees are equal. *) Fixpoint isEqual (tree1 : btree) (tree2 : btree) : bool := match tree1, tree2 with | EmptyTree, EmptyTree => true | EmptyTree, _ => false | _, EmptyTree => false | Node n11 n12, Node n21 n22 => (andb (isEqual n11 n21) (isEqual n12 n22)) end. Lemma isEqual_implies_equal : forall tree1 tree2 : btree, (isEqual tree1 tree2) = true -> tree1 = tree2.
What I have been trying to do is apply induction on tree1 followed by tree2, but this doesn't really work correctly. It seems I need to apply induction to both simultaneously, but can't figure out how.