Coq is an interactive theorem prover.

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Theorem plus_n_n_injective, exercise

Help needed with an exercise from Software Foundations. This is the theorem: Theorem plus_n_n_injective : ∀n m, n + n = m + m → n = m. Proof. I end up with n = 0 as goal and n + n = 0 as ...
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11 views

CoqIDE and JAVA

I want to retrieve the result of the compilation of a file. v from coqide or coqc for treated with java, rather I have treatment of an automaton and I want to build a graphical interface of this ...
2
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1answer
142 views

Had a verified SSL/TLS implementation in a 'safe language' would it still have been vulnerable be to the heartbleed attack? [on hold]

Here the author makes the claim: Formalizing the TLS specification and proving that an implementation is consistent with it only shows that the implementation is logically correct. However, it ...
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1answer
18 views

How to create a bibliography source file in coq

I want to create a file bibliography in coq, i have a model of an automaton, Record automaton :Type:= mk_auto { states : Set; actions :Set; initial : states; ...
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1answer
26 views

Stuck on even lemma with exists

I'm stuck on a lemma "left as an exercise" from this lecture. It goes like this: Lemma even_double : forall n, even n -> exists k, n = 2 * k. Proof. intros n H. induction H. ... Where even ...
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1answer
19 views

What is inductive predicates?

How would you explain inductive predicates? What are they used for? What's the theory behind? Are they only present in dependent type systems, or in other systems as well? Are they related to GADT:s ...
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1answer
23 views

Coq intros syntax

Could someone please explain the intros syntax below? Lemma is_single_nBTP : forall t, is_single_nBT t = true -> exists n : nat, t = Leaf n. Proof. intros [ nleaf | nnode t1 t2] h. exists nleaf. ...
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36 views

How do you determine which terms to call intros on in coq

I am a beginner with coq, so this may be a trivial question. Sometimes I can't figure out which terms I need to call intros on, when writing a Theorem. A simple example, Theorem silly1 : forall (n m ...
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2answers
41 views

Function of comparison coq

I want to make a function of natural numbers comparison in coq I declare a Set of invariant contain sup, inf, egal Inductive invr:Type:=inf | sup | egal. And I define a function comparaison ...
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2answers
22 views

Coq: apply transitivity with substitution

I want to proof this lemma in Coq: a : Type b : Type f : a -> b g : a -> b h : a -> b ______________________________________(1/1) (forall x : a, f x = g x) -> (forall x : a, g x = h x) ...
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38 views

Prop and bool in Coq

How can I use a comparison of to rational numbers in an if-statement? if 1 = 2 then 1 else 2 1 = 2 is of course Prop and not bool.
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1answer
22 views

How to solve this coq-made program?

"If a list contains a zero among its elements, then the product of its elements is 0." From this code : Fixpoint mult (list Z) := match list with nil => 1 | x::tl => x * mult tl ...
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1answer
28 views

Coq - IP Notation

Coq - IP Notation I want to create a notation for ip addresses. The following is my notation definition that works fine: Inductive IP := ip : nat -> nat -> nat -> nat -> IP. Notation "a ...
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1answer
27 views

Coq: Ltac definitions over variable argument lists?

While trying to create an Ltac definition that loops over a variable-length argument list, I encountered the following unexpected behavior on Coq 8.4pl2. Can anyone explain it to me? Ltac ltac_loop ...
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2answers
29 views

Solving an issue in a coq-made program

There is a little problem with one of my coq program, i've got no idea why i can't go further with this : forall A B C: Prop, A\/(B\/C)->(A\/B)\/C. Proof. intros. destruct H as [H1 | [H2 | H3 ]]. ...
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1answer
70 views

Cong, subst and equality type in dependently typed programming languages

In dependently typed type theory there's a equality type. Usually when this type is defined, a number of utilities, namely cong and subst are introduced. How expressive they are? Is it possible to ...
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2answers
65 views

Why dependently typed languages use weak head normal form to compare for convertibility

As far as I understand, almost all dependently typed languages use weak head normal form for convertibility. Why is it so? Why is it enough to check for convertibility (it seems not enough for me)? ...
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1answer
25 views

How to apply rewrite inside a specific subexpression?

I'm using the online book "Software Foundations" to learn about Coq. In the second chapter, it is asked to prove the "plus_assoc" theorem: Theorem plus_assoc : forall n m p : nat, n + (m + p) = (n + ...
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0answers
36 views

List comprehensions in Coq

I want to use Monad comprehensions in Coq. Since I thought it is very difficult for me to implement notations which needs MonadPlus such as [ x | x <- m, x < 4 ], I didn't try to implement such ...
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1answer
32 views

Initialisation of variables

i am beginner with coq. I have a question about a manipulation of variables, for example i have: Parameter x:nat. I want to initialise x by 0 and after that i want affect 5 to x,so i didn't know ...
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1answer
18 views

Is it possible to define simultaneously a term and an abbreviation in Coq

I know it is possible to define a term and a notation simultaneously with where : Inductive and (A B:Prop) : Prop := conj : A -> B -> A /\ B where "A /\ B" := (and A B). Is it possible to do ...
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1answer
23 views

Modelisation of an automaton with coq

i have a problem with definition of an automaton in coq proof assisstant, an error was shown when i create this code: (*automate*) Record automaton :Type:= mk_auto { states : Set; actions ...
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1answer
86 views

Can Coq be used (easily) as a model checker?

As the title says, can Coq be used as a model checker? Can I mix model checking with Coq proving? Is this usual? Google talks about a "µ-calculus", does anyone have experience with this or something ...
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1answer
24 views

Inductive Predicate for Addition in Coq

I'm new to inductive predicates in Coq. I have learned how to define simple inductive predicates such as "even" (as in adam.chlipala.net/cpdt/html/Predicates.html) or "last" (as in ...
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4answers
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How to automatically generate “good” names when decomposing existential hypothesis

I have an existential hypothesis, such as: H : exists (a : A) (b : B) (c : C), P a b c which I want to decompose to: a : A b : B c : C H0 : P a b c The tactic decompose [ex] H; clear H does ...
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23 views

How to Create Ensemble in Coq

How do I create a set of elements in Coq? I have looked at the documentation for Ensembles but I don't see any way to construct one. For example, in Haskell I'd use the "Data.Set.fromList [1..10]" ...
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1answer
73 views

Representing inductive types

I implemented dependently typed lambda calculus in the spirit of this article: http://www.andres-loeh.de/LambdaPi/LambdaPi.pdf The calculus, works and I experimented with it and extended with several ...
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1answer
74 views

defining Maybe monad in Coq

I want to define Maybe monad using type class in Coq. Monad inherits Functor. I want to prove Some (f x') = fmap f (Some x'), which is one of the monad laws. I used compute, reflexivity and destruct ...
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1answer
41 views

Printing internal representation of a Coq term

How to print the internal OCaml representation of a term in Coq (exposing the data constructors like Lambda, App, Rel, etc... )? Is there any equivalent of derived show, as in Haskell, in OCaml?
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38 views

matching subterm in Ltac in Coq

I want to find a subterm in the goal which is a function of just a given expression. For eg, for the Goal: a + maximum (map sum l) = f a l I want to somehow find maximum (map sum l) (which is a ...
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1answer
61 views

State-machines in Coq

Can I use Coq to prove that a state machine cannot reach an invalid state? How?
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39 views

coq- Prove some expressions do not terminate

I need to prove this theorem. Theorem expr_not_terminate: ~(forall (e : expr) (s : state), exists (v : value), evalExpr e s v). Proof. ...
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56 views

Proven correct receipt module

I'm working on a register which produces receipts when customers buy articles. As an exercise, I'm thinking about making a receipt module in Coq which cannot produce erroneous receipts. In short, the ...
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1answer
36 views

coq. ordered pair of natual numbers

I am trying to defined an inductive data type to hold pair of natural numbers. Here is what I have done Definition ordered_pair := (nat * nat) % type. Inductive nat_pair(A ...
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1answer
47 views

How to prove forall x, (R x \/ ~ R x) [in the Coq proof assistant]?

How does one prove forall x, (R x \/ ~R x) in Coq. I'm a noob at this and don't know much of this tool. This is what I wrote: Variables D: Set. Variables R: D -> Prop. Variables x:D. Lemma tes : ...
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1answer
33 views

Adding a lemma to an Instance of type Class in Coq

In file SemiRing.v I defined some classes: (** Setoids. *) Class Setoid := { s_typ :> Type; s_eq : relation s_typ; s_eq_Equiv : Equivalence s_eq }. Existing Instance s_eq_Equiv. Module ...
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1answer
31 views

Fixpoint on Types

I want to create a function(fixpoint to be specific) in Coq that takes two types as input and tells whether they are same or not. The signature of this function can be given as Fixpoint areSame (X1 ...
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0answers
20 views

Cannot compile Coq 8.4pl3

When trying to compile Coq 8.4pl3, I get this error at make world: File "#######/projets/coq/coq-8.4pl3/theories/Init/Logic.v", line 11, characters 0-25: Error: The file ...
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2answers
52 views

Coq convert non exist to forall statement

I'm new to Coq. Here's my problem. I have a statement says: H : forall x : term, ~ (exists y : term, P x y /\ ~ P y x) I guess it is equivalent to: forall x y : term, (P x y /\ ~ P y x) -> ...
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1answer
51 views

What forms of goal in Coq are considered to be “true”?

When I prove some theorem, my goal evolves as I apply more and more tactics. Generally speaking the goal tends to split into sub goals, where the subgoals are more simple. At some final point Coq ...
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2answers
52 views

Is there a way to “and” two decision procedures into one in Coq?

I am trying to define a function in Coq with a if ... then ... else ... and in my condition for 'if' I would like to test if a nat is in a interval. For instance a, b, x are nat and I want to test if ...
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1answer
70 views

With Coq Proof General, Emacs executes on every period. How do I stop it?

I'm using Proof General in Emacs on Aquamacs and every time I write a period (".") everything is executed (up to that period). It seems like an electric behavior but it's not. All other keys behave ...
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1answer
23 views

Applying an implication from a hypothesis

My coq proof currently looks like this: a0 : nat a1 : nat n : nat l : list nat c : nat -> nat -> bool H : forall a0 a1 a2 : nat, Is_true (c a0 a1) /\ Is_true (c a1 a2) -> Is_true (c a0 ...
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2answers
127 views

Definition of a certified program

I see a couple of different research groups, and at least one book, that talk about using Coq for designing certified programs. Is there are consensus on what the definition of certified program is? ...
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1answer
52 views

Boolean equality over natural numbers in Coq

Is it possible to compare two natural numbers, x and y, in Coq, and have the equality be returned as a boolean value? Ideally I would like to be able to do something like: Variable x : nat. Variable ...
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1answer
42 views

Using List remove function

I'm trying to use the list remove function in Coq standard library but it asks for a bizarre typing and I don't know how to solve. The function I'm implementing is to make a list of free variables in ...
2
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1answer
115 views

Implementing a Coq tactic in OCaml

I want to implement a tactic called solve, which can solve a linear equation expressed as a theorem. For example : Theorem leq : exists x , x + 3 = 2*x - 3 . Proof. solve. Qed. I want to implement ...
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1answer
84 views

Coq: adding a “strong induction” tactic

"Strong" (or "complete") induction on the natural number means that when proving the induction step on n, you can assume the property holds for any k Theorem strong_induction: forall P : nat -> ...
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1answer
65 views

Coq: How to add meaningful hints?

I am new to Coq and might be doing completely the wrong way. It seems to me that I need to choose between writing axioms/theorems that are nicely human-readable and axioms/theorems that are useful as ...
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1answer
50 views

Lazy Evaluation Correctness and Totality (Coq)

As the title suggests, my question concerns proving the correctness and totality of lazy evaluation of arithmetic expressions in Coq. The theorems that I would like to prove are three in total: ...