I want to prove the following theorem:
Theorem T5: forall s t, (forall u, OoS s u <-> OoS t u) -> s = t.
My current context and goal are:
1 subgoal s, t : Entity H : forall u : Entity, OoS s u <-> OoS t u ______________________________________(1/1) (forall v : Entity, OoS s v <-> OoS s v \/ OoS t v) /\ (forall v : Entity, OoS t v <-> OoS s v \/ OoS t v)
I was wondering if it’s possible to use the equivalence of the implication to rewrite the goal as
forall v : Entity, OoS s v <-> OoS t v as the right part of both equivalence are the same. And then I would use the assumption tactic to finish my proof. But I don’t know if it’s possible to do so and how to do it.