Questions tagged [coq]

Coq is a formal proof management system, semi-interactive theorem prover and functional programming language. Coq is used for software verification, the formalization of programming languages, the formalization of mathematical theorems, teaching, and more. Due to the interactive nature of Coq, we recommend questions to link to executable examples at https://x80.org/collacoq/ if deemed appropriate.

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Convertion between Z and nat in coq

I have a list of Z elements and I am trying to convert the top most element into nat value. I have already found something that might help: Z.to_nat from the Standard Library but it doesn't work as ...
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Extracting Coq to Haskell while keeping comments

Is there anyway to keep comments while extracting Coq to Haskell? Ideally, I would like to have machine generated Haskell files untouched by humans, and so the motivation of extracting comments is ...
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Proving decidability for a datatype that includes a vector

I'm trying to work with a datatype that represents expressions in a sort of universal algebra context. The usual way to express this in (pen and paper) maths is that you have a set of function symbols,...
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Coq proof that factorial N / (factorial k * factorial (N-k)) is integer

I could not find the proof that N choose k is intergral in the Coq standard library. What would be a short self-contained proof of this lemma? Lemma fact_divides N k: k <= N -> Nat.divide (...
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Splitting disjunctions (\/) in Coq hypothesis

I'm trying to prove a simple lemma in Coq where the hypothesis is a disjunction. I know how to split disjunctions when they occur in the goal, but can't manage to split them when they appear in the ...
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How to prove something by using a definition?

If I define multiplication like this (drugi_c), how do I prove e.g. X*0=0? (How to prove something by the definition?) Fixpoint drugi_c(x y: nat): nat:= match x, y with | _, O => O | O, _ =&...
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Well-founded induction for a counting predicate

Here is the definition for the Count predicate. It uses 2 indices to denote starting and ending elements, "check" predicate to count/skip the "current" element and the last argument "sum" to keep ...
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Transitivity of -> in Coq

I'm trying to prove the transitivity of -> in Coq's propositions: Theorem implies_trans : forall P Q R : Prop, (P -> Q) -> (Q -> R) -> (P -> R). Proof. I wanted to destruct all ...
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Field tactic with partial inverse function

Coq defines the multiplicative inverse function 1/x as a total function R -> R, both in Rdefinitions.v and in Field_theory.v. The value 1/0 is left undefined, all calculation axioms ignore it. ...
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Converting Coq term in AST form to polish notation using Python

Say I have an arbitrary Coq Term (in AST format using s-expressions/sexp) for example: n = n + n and I want to automatically convert it to: = n + n n by traversing the AST tree (which is simple a ...
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Proving (~A -> ~B)-> (~A -> B) -> A in Coq

I have been trying to prove the following tautology in Coq. Theorem Axiom3: forall A B: Prop, (~A -> ~B)-> ((~A -> B) -> A). My plan was the to do following Theorem Axiom3: forall A B: ...
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Extracting Coq to Haskell

I'm experimenting with Coq's extraction mechanism to Haskell. I wrote a naive predicate for prime numbers in Coq, here it is: (***********) (* IMPORTS *) (***********) Require Import Coq.Arith....
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Build Coq and CoqIDE from source

Following this post I managed to install LablGtk (I think) but still when I try to configure-make Coq I get the following message that CoqIDE will not be built: $ ./configure You have OCaml 4.09.0+...
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Church encoding of dependent pair

One can easily Church-encode pairs like that: Definition prod (X Y:Set) : Set := forall (Z : Set), (X -> Y -> Z) -> Z. Definition pair (X Y:Set)(x:X)(y:Y) : prod X Y := fun Z xy => xy x ...
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Induction principle for `le`

For the inductive type nat, the generated induction principle uses the constructors O and S in its statement: Inductive nat : Set := O : nat | S : nat -> nat nat_ind : forall P : nat -> Prop,...
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Building Coq from source fails with incorrect ocaml version

I'm trying to build Coq from source with: $ git clone https://github.com/coq/coq.git $ cd coq && ./configure for which I get the (false) response: Your version of OCaml is 4.04.0. You need ...
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coq syntax of theorem implication

I follow this tutorial : https://softwarefoundations.cis.upenn.edu/lf-current/Basics.html Section 'Proof by Rewritting' : The code Theorem plus_id_example : forall n m : nat, n = m => n + n =...
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Transform casual list into dependently typed list in Coq

I have following definition of list in Coq: Variable A : Set. Variable P : A -> Prop. Hypothesis P_dec : forall x, {P x}+{~(P x)}. Inductive plist : nat -> Set := pnil : plist O | pcons : ...
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Coq: how to apply hypothesis with internal “if” branch

I need to apply FixL_Accumulate to prove the goal, but the unification fails due to the let statements and internal "if-then-else". The question is about how to match the shapes here? Require Import ...
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Paramcoq: Free theorems in Coq

How can I prove the following free theorem with the plugin Paramcoq? Lemma id_free (f : forall A : Type, A -> A) (X : Type) (x : X), f X x = x. If it is not possible, then what is the purpose of ...
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Verify Coq proofs in a different language

Is there support to interpret and verify Coq proofs in a different environment (e.g., Java, C++) other than Coq? An obvious approach is to build a whole interpreter from scratch in say Java, but I ...
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Proving a contradiction in Coq

I'm trying to prove a simple lemma with Coq, and I'm having some trouble ruling out an infeasible case. Here is my lemma: Theorem helper : forall (a b : bool), ((negb a) = (negb b)) -> (a = b). ...
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Confusing obligations generated by `Program` tactic

I'm quite new to coq proof assistant and am still finding my feet. I've encountered a case which I don't know how to deal with: I tried to use Program Fixpoint tactic to weaken the requirements on my ...
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Church numerals and universe inconsistency

In the following code, the statement add'_commut is accepted by Coq but add_commut is rejected because of a universe inconsistency. Set Universe Polymorphism. Definition nat : Type := forall (X : ...
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Recursion for Church encoding of equality

For the Church encoding N of positive integers, one can define a recursion principle nat_rec : Definition N : Type := forall (X:Type), X->(X->X)->X. Definition nat_rec (z:N)(s:N->N)(n:N) ...
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Church encoding for dependent types: from Coq to Haskell

In Coq I can define a Church encoding for lists of length n: Definition listn (A : Type) : nat -> Type := fun m => forall (X : nat -> Type), X 0 -> (forall m, A -> X m -> X (S m)) -&...
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Coq file generated by WP does not compile

I have installed frama-c (18.0) and coqide (8.9) through opam (plus other needed dependencies of course, but that may not be the matter here). Well the point is I simply installed it through opam, not ...
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How do I use a lemma from a Coq library?

I am trying to use the lemma eqb_sym from this library: https://coq.inria.fr/library/Coq.Structures.Equalities.html I tried "Require Import Coq.Structures.Equalities." and "Require Import ...
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“if” is not just sugar for “match”

What is the difference between these two definitions: Definition f : forall x:bool, if x then bool else nat := fun x => match x with | true => true | false => 42 ...
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Trouble in implementing dependently typed lookup in Coq using Equations

I'm trying to use Equations package to define a function over vectors in Coq. The minimum code that shows the problem that I will describe is available at the following gist. My idea is to code a ...
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Coq doesn't recognize equality of dependent list

I made a question before, but i think that question was bad formalized so... I am facing some problems with this specific definition to prove their properties: I have a definition of a list : ...
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Proving another property of finding same elements in lists

Following my question here, I have a function findshare which finds the same elements in two lists. Actually, keepnotEmpty is the lemma I need in my program after applying some changes to the initial ...
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Coq: How to produce a strong polymorphic dependent type hypothesis

I have been having some problems with dependent induction because a "weak hypothesis". For example : I have a dependent complete foldable list : Inductive list (A : Type) (f : A -> A -> A) : ...
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Prove a property of finding the same elements in two lists

I'm new to Coq. I have a function findshare which finds the same elements in two lists. Lemma sameElements proves that the result of function findshare on the concatenation of two lists is equal to ...
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To which subterms can we apply a lemma?

Suppose we have the goal a + b + c + d = a + c + b + d where a, b, c, d: nat and the lemma plus_comm from Arith: plus_comm : forall n m : nat, n + m = m + n It is possible to do rewrite ...
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Intersection of lists using List.filter

Following my question here, I'm proving if the intersection of two lists is not empty then by adding another list to each of the lists, still the intersection will be not empty. I wonder how I should ...
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Searching a list by List.filter

In my program, I use List.filter to search a list for finding specific elements. I am proving if List.filter finds some elements in a list, then by appenindg another list we still get those elements ...
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Lift existentials in Coq

Can this lemma be proven in Coq ? Lemma liftExists : forall (P : nat -> nat -> Prop), (forall n:nat, exists p:nat, P n p) -> exists (f : nat -> nat), forall n:nat, P n (f n). The ...
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How forall is implemented in Coq

In trying to understand how to implement forall in JS or Ruby, I would be interested to know how it's actually implemented in Coq. Maybe that will help shed some light. I don't seem to find the ...
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What <> is in Coq

It's difficult to search for but wondering what <> means as in here: Axiom point : Type. Axiom line : Type. Axiom lies_in : point -> line -> Prop. Axiom ax : forall (p1 p2 : point), p1 &...
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How to define axiom of a line as two points in Coq

I am trying to find an example axiom in Coq of something like the line axiom in geometry: If given two points, there exist a line between those two points. I would like to see how this could be ...
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Proof of application equality in coq

I have a sequence of applications in that way (f (f (f x))), being f an arbitrary function and any applications numbers sequences. I want to prove that f (x y) and (x (f y)), x = (f f f ...) and y = ...
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Learning coq, not sure what the error means NNPP

So i've just started to learn coq (and it is way over my head so far) and I'm trying to do a basic proof and I'm pretty lost, found some help so far but what I think I'm supposed to do coq throws an ...
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Why does Coq rename variables in induction?

I'm trying to prove the following theorem. Theorem subseq_trans : forall (l1 l2 l3 : list nat), subseq l1 l2 -> subseq l2 l3 -> subseq l1 l3. Proof. intros l1 l2 l3 H12 H23. generalize ...
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Representing Higher-Order Functors as Containers in Coq

Following this approach, I'm trying to model functional programs using effect handlers in Coq, based on an implementation in Haskell. There are two approaches presented in the paper: Effect syntax is ...
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How to easily prove the following in Coq such as using only assumptions?

Is there an easy way to prove the following in Coq such as using only assumptions? (P -> (Q /\ R)) -> (~Q) -> ~P
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How to prove the following in Coq?

How to prove the following in Coq? (p->q)->(~q->~p) Here is what I started with: Lemma work : (forall p q : Prop, (p->q)->(~q->~p)). Proof. intros p q. intros p_implies_q not_q. ...
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How to prove logical equivalence in Coq?

How do I prove the following using Coq? (q V p) ∧ (¬p -> q) <-> (p V q). My Attempt Lemma work: (forall p q: Prop, (q \/ p)/\(~p -> q) <-> (p \/ q)). Proof. intros p q. split. intros ...
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How to prove logic equivalence in Coq?

I want to prove the following logic equivalence in Coq. (p->q)->(~q->~p) Here is what I attempted. How can I fix this? Lemma work : (forall p q : Prop, (p->q)->(~q->~p)). Proof. intros p q....
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Section mechanism in Coq. Forbid omitting of hypotheses from context

I need more primitive mechanism of generalization in sections. For example, Section sec. Context (n:nat). Definition Q:=bool. End sec. Check Q. I will obtain Q : Set, but I need Q:nat->Set. I've ...