How can I apply rewrite -> targetting only a sub-expression? For example, consider this theorem:
Parameter add : nat -> nat -> nat.
Axiom comm : forall a b, add a b = add b a.
Theorem t1 : forall a b : nat,
(add (add a b) (add a (add a b))) =
(add (add a b) (add a (add b a))).
Intuitively, it requires commuting only one (add a b) sub-expression, but if I do rewrite -> (comm a b), it rewrites all the occurrences. How can I target a particular sub-expression?
This is a case where the ssreflect matching facilities will usually be more convenient than "at" [I'd dare to say sub-term rewrites are often a cause of people switching to ssreflect's rewrite]. In particular:
rewrite {pos}[pat]lemma will select occurrences pos of pattern pat to rewrite,
pat can be a contextual pattern that may allow you improve the robustness of your scripts.
You can target a specific occurrence with the rewrite tactic using the suffix at N. Occurrences are numbered from 1 in left-to-right order. You can rewrite multiple occurrencess by separating their indices with spaces. You need Require Import Setoid. The at suffix is also available with some other tactics that target occurrences of a term, including many tactics that perform conversions (change, unfold, fold, etc.), set, destruct, etc.
intros.
rewrite -> (comm a b) at 2.
rewrite -> (comm _ _).
reflexivity.
There are other possible approaches, especially if all you need is to apply equalities. The congruence tactic can find what to rewrite and apply symmetry and transitivity on its own, but you need to prime it by adding all equivalences to the context (in the form of universally-quantified equalities), it won't query hint databases.
assert (Comm := comm).
congruence.
To get more automation, Hint Rewrite creates a database of theorems which the tactic autorewrite will try applying. For more advanced automation, look up generalized rewriting with setoids, which I'm not sufficiently familiar with to expound on.
Related
Here I mean axiom as what we can define with the Axiom keyword in Coq Gallina, not with such command-line argument passing to Coq.
I know some axioms make Coq inconsistent. However, AFAIK they don't make Coq Turing complete. In my rough understanding, it's because they don't offer any additional computational behavior.
Is there one that makes Coq turning complete? If not, could you give a more concrete explanation of why it's impossible?
The answer to your question largely depends on where you want your functions defined in Coq to compute. In general, there is no problem to encode arbitrary partial functions in Coq using for instance step-indexing, see Mc Bride's "Turing completeness, totally free" for more details.
But you will only be able to evaluate these functions up to a specified finite bound in Coq.
If the goal is to write formally verified programs that could use arbitrary recursion and run them outside of Coq, then you don't need axioms, you can use the Extraction mechanism and its proof-erasure semantics as shown by the following example of an unbounded while loop:
Inductive Loop : Prop := Wrap : Loop -> Loop.
Notation next := (fun l => match l with Wrap l' => l' end).
Definition while {A : Type} (f : A -> A * bool) : Loop -> A -> A :=
fix aux (l : Loop) (a : A) {struct l} :=
let '(x, b) := f a in
if b then aux (next l) x else x.
Require Extraction.
Recursive Extraction while.
with extraction result:
type bool =
| True
| False
type ('a, 'b) prod =
| Pair of 'a * 'b
(** val while0 : ('a1 -> ('a1, bool) prod) -> 'a1 -> 'a1 **)
let rec while0 f x =
let Pair (x0, b) = f x in (match b with
| True -> while0 f x0
| False -> x0)
Note that the function while requires a proof of termination in Coq that is erased once it is turned to ocaml.
Finally, as you explain, you would need to extend Coq's computational reduction machinery if you wanted evaluation of partial functions to stay inside Coq. There is no general mechanism providing this feature at the moment (even though there is a coq enhancement proposal to add rewriting rules). It might be possible to abuse definitional UIP to evaluate partial functions. In all cases, adding the possibility to evaluate partial functions inside Coq, making it part of the conversion, automatically entails that the theory itself because undecidable (the proof assistant may fail to return a typechecking result).
I have a hard time finding the available rewrite rules for my situation. As I don't want to bother you with each rewrite question, I was wondering do you have some tips for finding suitable rewrite rules?
Do you have any tips on how to solve and or search for rewriting the following example:
1 subgoal
H: P
H0: Q
__________
R
And say I have Lemma Join: P /\ Q = R
In order to do this rewrite, I suppose I need to get H and H0 first rewritten into P /\ Q.
So how would you solve or find the rewrite rules for such a case?
Another example
H: a <= b
____________
b < a
I am confident there should exists some commutativity rewrite rule for this, but how can I best find this rule?
Many thanks in advance!
First a tip so you don't run into this problem later: Don't confuse equality of types for logical equivalence. What you usually mean in your first example above is that P/\Q <-> R, not that the type P/\Q is definitionally the same type as R.
With regards to your question about finding lemmas in the library; yes, it is very important to be able to find things there. Coq's Search command lets you find all (Required) lemmas that contain a certain pattern somewhere in it, or some particular string. The latter is useful because the library tends to have a somewhat predicable naming scheme, for instance the names for lemmas about decidability often contains then string "dec", commutativity lemmas often are called something with "comm" etc.
Try for example to search for decidability lemmas about integers, i.e. lemmas that have the term Z somewhere inside them, and the name contains the string "dec".
Require Import ZArith.
Search "dec" Z.
Back to your question; in your case you want to find a lemma that ends with "something and something", so you can use the pattern ( _ /\ _ )
Search ( _ /\ _ ).
However, you get awfully many hits, because many lemmas ends with "something and something".
In your particular case, you perhaps want to narrow the search to
Search (?a -> ?b -> ?a /\ ?b).
but be careful when you are using pattern variables, because perhaps the lemma you was looking for had the arguments in the other order.
In this particular case you found the lemma
conj: forall [A B : Prop], A -> B -> A /\ B
which is not really a lemma but the actual constructor for the inductive type. It is just a function. And remember, every theorem/lemma etc. in type theory is "just a function". Even rewriting is just function application.
Anyway, take seriously the task of learning to find lemmas, and to read the output from Search. It will help you a lot.
Btw, the pattern matching syntax is like the term syntax but with holes or variables, which you will also use when you are writing Ltac tactics, so it is useful to know for many reasons.
In the Lean manual 'Theorem proving in Lean' I read:
"With the classical axioms, we can prove that every proposition is decidable".
I would like to seek clarification about this statement and I am asking a Coq forum, as the question applies as much to Coq as it does to Lean (but feeling I am more likely to get an answer here).
When reading "With the classical axioms", I understand that we have something equivalent to the law of excluded middle:
Axiom LEM : forall (p:Prop), p \/ ~p.
When reading "every proposition is decidable", I understand that we can define a function (or at least we can prove the existence of such a function):
Definition decide (p:Prop) : Dec p.
where Dec is the inductive type family:
Inductive Dec (p:Prop) : Type :=
| isFalse : ~p -> Dec p
| isTrue : p -> Dec p
.
Yet, with what I know of Coq, I cannot implement decide as I cannot destruct (LEM p) (of sort Prop) to return something other than a Prop.
So my question is: assuming there is no mistake and the statement "With the classical axioms, we can prove that every proposition is decidable" is justified, I would like to know how I should understand it so I get out of the paradox I have highlighted. Is it maybe that we can prove the existence of the function decide (using LEM) but cannot actually provide a witness of this existence?
In the calculus of constructions without any axioms, there is meta-theoretical property that every proof of A \/ B is necessarily a proof that A holds (packaged using the constructor or_introl) or a proof that B holds (using the other constructor). So a proof of A \/ ~ A is either a proof that A holds or a proof that ~ A holds.
Following this meta-theoretical property, in Coq without any axioms, all proofs of propositions of the form forall x, P x \/ ~P x actually are proofs that P is decidable. In this paragraph, the meaning of decidable is the commonly accepted meaning, as used by computability books.
Some users started using the word decidable for any predicate P so that there exists a proof of forall x, P x \/ ~ P x. But they are actually talking about a different thing. To make it clearer, I will call this notion abuse-of-terminology-decidable.
Now, if you add an axiom like LEM in Coq, you basically state that every predicate P becomes abuse-of-terminology-decidable. Of course, you cannot change the meaning of conventionally-decidable by just adding an axiom in you Coq development, so there is no inclusion anymore.
I have been fighting against this abuse of terminology for years, but without success.
To be more precise, in Coq terminology, the term decidable is not used for propositions or predicates that enjoy LEM, but for propositions or predicates that enjoy the stronger following statement:
forall x, {P x}+{~P x}
Proofs of such propositions are often named with _dec suffix, where _dec directly refers to decidable. This abuse is less strong, but it is still an abuse of terminology.
I'm looking for utility similar to one of Hoogle for Haskell. For the sake of example, let's say I need a function of signature forall n m:nat, n <> m -> m <> n.
When my Google searches don't yield any results, I write Definition foo: forall n m:nat, n <> m -> m <> n. and write intros; auto with arith. to prove it. But is there any way to not pollute my workspace with these temporary results and search for them based on their type? I'm sure I've seen this symmetry stated somewhere in standard library.
There's a Search command that's somewhat similar to Hoogle, but a bit more precise. Here are some searches you might use for symmetry of not. In practice I would use the first and fall back to the second if there were a lot of results.
Search (_ <> _). (* everything related to not equal *)
Search (?a <> ?b -> ?b <> ?a). (* exactly what you want -
note that unlike Hoogle, you need to use ?a for a pattern variable *)
Search (?R ?a ?b -> ?R ?b ?a). (* this searches for any symmetry theorem;
not terribly useful for it's cool that it works *)
Search not "_sym". (* if you know some of the theorem name you can use that, too *)
Say I want to have a tactic to clear multiple hypothesis at once, to do something like clear_multiple H1, H2, H3.. I tried to do that using pairs, like the following:
Ltac clear_multiple arg :=
match arg with
| (?f, ?s) => clear s; clear_multiple f
| ?f => clear f
end.
But then, the problem is that I have to place parenthesis to have a Prod:
Variable A: Prop.
Goal A -> A -> A -> True.
intros.
clear_multiple (H, H0, H1).
My question is, how to do that without using Prods ?
I checked this question, but it is not exactly what I want, since the number of arguments I want is not known.
You might like to know that the clear tactic can take multiple arguments, so you do not need to define a new tactic: you can just write clear H H0 H1.
Of course, you might want to define such n-ary tactics for other tasks. Coq has a tactic notation mechanism that supports such definitions. Unfortunately, they are not too powerful: you can only pass a list of arguments of a certain kind to a tactic that expects multiple arguments (like clear); I don't think it can give you a list that you can iterate on programmatically.