Jiahong Lee (Jun 20 2022 at 07:57): Jiahong Lee (Jun 20 2022 at 07:57):Hi, I have a question with this example.
Given this
Theorem orb_true_iff : forall b1 b2,
b1 || b2 = true <-> b1 = true \/ b2 = true.
the example proves by first "specialising" the theorem, then demonstrates how one can use destruct on an applied theorem:
Lemma orb_true : forall b1 b2 : bool,
b1 || b2 = true -> b1 = true \/ b2 = true.
Proof.
intros b1 b2. apply orb_true_iff.
Qed.
Example lemma_application_ex2' : forall b : bool,
false || b = true -> b = true.
Proof.
intros b H. destruct (orb_true _ _ H) as [Hcontra | Hb].
- discriminate Hcontra.
- apply Hb.
Qed.
My questions are:
destruct with orb_true_iff directly? My attempt
Example lemma_application_ex2 : forall b : bool,
false || b = true -> b = true.
Proof.
intros b H. destruct (orb_true_iff false _ H) as [Hcontra | Hb].
...
Qed.
fails with the error message:
Error: Illegal application (Non-functional construction):
The expression "orb_true_iff false ?b2" of type "false || ?b2 = true <-> false = true \/ ?b2 = true"
cannot be applied to the term
"H" : "false || b = true"
which is confusing. It seems to me perfectly fine for Coq to substitute b into the ?b2 of orb_true_iff, then figure out I'm trying to apply -> of the bidirectional.
-> version of the orb_true_iff theorem to bypass the error message? If so, how?Thanks!
Michael Soegtrop (Jun 20 2022 at 08:11):A <-> B means A->B /\ B->A. So unlike an implication A -> B the propositional equivalence A <-> B is not a functional construct. For this reason you cannot apply it to H. If orb_true_iff would be an implication rather than an <-> this would work.
Jiahong Lee (Jun 21 2022 at 00:36):Michael Soegtrop said:
A <-> BmeansA->B /\ B->A. So unlike an implicationA -> Bthe propositional equivalenceA <-> Bis not a functional construct. For this reason you cannot apply it toH. Iforb_true_iffwould be an implication rather than an<->this would work.
Hmm, that's intriguing.
With orb_true_iff, I can prove it as such:
Example lemma_application_ex2' : forall b : bool,
false || b = true -> b = true.
Proof.
intros b H. apply orb_true_iff in H. destruct H as [Hcontra | Hb].
- discriminate Hcontra.
- apply Hb.
Qed.
And the given example above can also be rewritten as such:
Example lemma_application_ex2' : forall b : bool,
false || b = true -> b = true.
Proof.
intros b H. apply orb_true in H. destruct H as [Hcontra | Hb].
- discriminate Hcontra.
- apply Hb.
Qed.
As you can see, there is a similarity between the two. So as a user, I would expect both to work with the destruct (orb_true _ _ H) as [...] shorthand... And from your answer, it seems like there is no way for the destruct shorthand to work with orb_true_iff?
Jiahong Lee (Jun 22 2022 at 00:27):Takeaway: the destruct shorthand doesn't work with orb_true_iff. Use the long way: apply <TERM> in <HYPOTHESIS>. destruct <HYPOTHESIS> as ...
UPDATE: Read below.
Notification Bot (Jun 22 2022 at 00:27):Jiahong Lee has marked this topic as resolved.
Paolo Giarrusso (Jun 22 2022 at 03:31):there is a different shorthand here:
Example lemma_application_ex2 : forall b : bool,
false || b = true -> b = true.
Proof. now intros b [[=]|H]%orb_true_iff. Qed.
For a slightly less compact proof:
Proof.
intros b [Hcontra|Hb]%orb_true_iff.
- discriminate Hcontra.
- apply Hb.
Qed.
Thanks! It is indeed what I'm looking for, although not by using destruct.
After digging around, docs about the notation can be found here.
To explain a bit, the notation intros H%orb_true_iff will introduce the hypothesis H after applying orb_true_iff. Since H is a disjunction, you can use the or intropattern to decompose it: intros [H | H]%orb_true_iff. Proof:
Proof.
intros b [H | H]%orb_true_iff.
- discriminate H.
- apply H.
Qed.
Then for the first H, instead of solving with discriminate H, you can solve it directly with the [=] intro pattern. Proof:
Proof.
intros b [[=]| H]%orb_true_iff. apply H.
Qed.
Takeway: You can destruct the application of an iff theorem with the intros ...%<THEOREM> pattern.
Last updated: Sep 23 2023 at 07:01 UTC