Coq is an interactive theorem prover.

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Proving that a reversible list is a palindrome in Coq without exists tactic

For an exercise in software foundation I want to prove the following theorem : Theorem rev_pal {X:Type} : forall (l:list X), l = rev l -> pal l. However to proove this I want to use a lemma using ...
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Defining constants using existence proofs in Coq

After proving an existence statement, it is often notationally convenient to introduce a constant symbol for some witness of this theorem. As a simple example, it is much more simple to write (in ...
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Coq: substitution and dependent types

I'm at an odd place trying to prove an equation: 1 subgoals A : Type s : set A x : A s0 : s x x0 : A s1 : s x0 H : x0 = x ______________________________________(1/1) stv s x0 s1 = stv s x s0 What I ...
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How does the below code perform the required function?

Lemma odd_pred2n: forall n : nat, Even.odd n -> {p : nat | n = pred (Div2.double p)}. Lemma even_2n : forall n, even n -> {p : nat | n = double p}. Lemma even_odd_exists_dec:forall n, {p : ...
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21 views

What is GroupScope?

In all of the coq codes in ssreflect there is this statement Import GroupScope. What is GroupScope? If it is another file, where can I download it from?
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`rewrite at` fails when `rewrite` works

When I type rewrite <- […], the command replaces two occurences of the lemma in the goal, when I write rewrite <- […] at 2, it rewrites the second instance. However, when I wrtie rewrite <- ...
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30 views

Using an exponentiation function

This is the definition for exp in group theory: Definition exp : Z -> U -> U. Proof. intros n a. elim n; clear n. exact e. intro n. elim n; clear n. exact a. intros n valrec. exact (star a ...
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32 views

Prove a match statement

Trying to solve an exercise, I have the following definition that represents the integers : Inductive bin : Type := | Zero : bin | Twice : bin -> bin | TwiceOne : bin -> bin. The idea is that ...
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In Coq, how do I introduce a variable from an hypothesis into the environment?

Let's say I have made an Hypothesis about the existance of a value. How do I name that variable in the environment? Example: Require Import ZArith. Open Scope Z. Hint Resolve Zred_factor0 ...
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Implementing vector addition in Coq

Implementing vector addition in some of the dependently typed languages (such as Idris) is fairly straightforward. As per the example on Wikipedia: import Data.Vect %default total pairAdd : Num a ...
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About the refine tactic in Coq

Consider the following lines (in Coq): Variable A : Type. Variable f g : A -> A. Axiom Hfg : forall x, f x = g x. Variable a b : A. Axiom t : g a = g b. Goal f a = g b. The tactic refine ...
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Eval compute is incomplete when own decidability is used in Coq

The "Eval compute" command does not always evaluate to a simple expression. Consider the code: Require Import Coq.Lists.List. Require Import Coq.Arith.Peano_dec. Import ListNotations. Inductive I : ...
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Inductive predicate with type parameters in Isabelle

I started learning Isabelle and wanted to try defining a monoid in Isabelle but don't know how. In Coq, I would do something like this: Inductive monoid (τ : Type) (op: τ -> τ -> τ) (i: τ): ...
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34 views

Difference between Definition and Let in Coq

What is the difference between a Defintion and 'Let' in Coq? Why do some definitions require proofs? For eg. This is a piece of code from g1.v in Group theory. Definition exp : Z -> U -> U. ...
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24 views

How to match a “match” expression?

I'm trying to write a rule for hypotheses, formulated with a help of match construction: Goal forall x:nat, (match x with | 1 => 5 | _ => 10 end = 5 -> x = 1)%nat. intros. x : nat H : match ...
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27 views

How to forbid simpl tactic to unfold arithmetic expressions?

simpl tactic unfolds expressions like 2 + a to "match trees" which doesn't seem simple at all. E. g.: Goal forall i:Z, ((fun x => x + i) 3 = i + 3). simpl. leads to: forall i : Z, match i with ...
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How to do “negative” match in Ltac?

I want to apply a rule in a case when some hypothesis present, and another is not. How can I check for this condition? E. g. Variable X Y : Prop. Axiom A: X -> Y. Axiom B: X -> Z. Ltac ...
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39 views

Rewriting a match in Coq

In Coq, suppose I have a fixpoint function f whose matching definition on (g x), and I want to use a hypothesis in the form (g x = ...) in a proof. The following is a minimal working example (in ...
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26 views

How to pull Coq source code from coqdoc pages

There is a specific library that I want to use, but this question applies to other libraries as well. Many of them are available in the pretty-printed coqdoc format. What is the easiest way to pull a ...
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54 views

Stuck in the construction of a very simple function

I am learning Coq. I am stuck on a quite silly problem (which has no motivation, it is really silly). I want to build a function from ]2,+oo] to the set of integers mapping x to x-3. That should be ...
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2answers
32 views

How to instantiate a variable (?8758) with a local variable?

My current proof state: ... qu := 1 : Z ============================ (array_at_ tint sh 0 100 (eval_id _busybits rho) * array_at tint sh (fun x : Z => Vint (Int.repr (keys m x))) 0 100 ...
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29 views

What does the perm_invK lemma in Ssreflect prove?

The following code is from perm.v in the Ssreflect Coq library. I want to know what this result is. Lemma perm_invK s : cancel (fun x => iinv (perm_onto s x)) s. Proof. by move=> x /=; ...
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21 views

Extraction of Type Scheme

I'm trying to extract some file system code that I've written in Coq. I want to replace my FileIO Monad with Haskell's IO Monad. My code looks like this: Variable FileIO : Type -> Type. Variable ...
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47 views

How to prove (forall n m : nat, (n <? m) = false -> m <= n) in Coq?

How to prove forall n m : nat, (n <? m) = false -> m <= n in Coq? I got as far as turning the conclusion into ~ n < m using by apply Nat.nlt_ge. Doing SearchAbout ltb yields ltb_lt: ...
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Contracting nested let statments

At the moment, I have an induction case like this (truncated other info like introduced variables, I can add it back if needed): IHe : not_set e -> (let (a, _) := sem e c in a) = c ...
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How to prove functions equal, knowing their bodies are equal?

How can we prove the following?: Lemma forfun: forall (A B : nat->nat), (forall x:nat, A x = B x) -> (fun x => A x) = (fun x => B x). Proof.
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Declaring implicit arguments in Coq: how many underscores are needed?

In the following snippet of Coq code (cut down from a real example), I'm trying to declare the first argument to exponent_valid as implicit: Require Import ZArith. Open Scope Z. Record float_format ...
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41 views

Unfold anonymous function in Coq proof

I am stuck trying to prove something in Coq that involves the use of a type class. The specific type class is almost identical to this Functor type class: https://gist.github.com/aztek/2911378 My ...
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2answers
34 views

Using contextual information in Coq pattern matching

I want to define a function app_1 which converts an n-ary function f : X ^^ n --> Y into a new function f' : (Z -> X) ^^ n --> Y, provided that there is a z : Z to apply once to all of its ...
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110 views

Composition of n-ary functions on natural numbers in Coq

I want to define a function compose which composes f : nat ^^ n --> nat with g1 ... gn : nat ^^ m --> nat such that compose n m f g1 ... gn x1 ... xm is equal to f (g1 x1 ... xm) ... (gn x1 ...
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How to rewrite over Rle inside a term with Rmult in Coq?

With respect to the relation Rle (<=), I can rewrite inside Rplus (+) and Rminus (-), since both positions of both binary operators have fixed variance: Require Import Setoid Relation_Definitions ...
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25 views

How to reason about array access in VST?

I have a trouble proving a trivial array access function (file arr.c): int get(int* arr, int key) { return arr[key]; } which is translated by clightgen arr.c to (file arr.v): ... Definition ...
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How to reference type class-polymorphic variables in a theorem type?

I have written a Haskell-style Functor type class: Class Functor (f: Type -> Type) := { map {a b: Type}: (a -> b) -> (f a -> f b); map_id: forall (a: Type) (x: f a), map id x = x } ...
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Defining isomorphism classes in Coq

How to define isomorphism classes in Coq? Suppose I have a record ToyRec: Record ToyRec {Labels : Set} := { X:Set; r:X->Labels }. And a definition of isomorphisms between two objects of type ...
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COQ gets wrong by proving “forall n:nat, ( n <= 0) -> n=0”

Can someone explain me the following - apparently wrong - COQ derivation? Theorem test: forall n:nat, ( n <= 0) -> n=0. intros n H. elim H. auto. COQ answer: 1 subgoal n : nat ...
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Coq - Passing parameters to a record

I'm having trouble in comparing elements of sets belonging to two distinct instances of the same record type. Consider the following record. Record ToyRec := { X:Set; Labels:Set; ...
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47 views

Inverting an obviously untrue hypothesis does not prove falsehood

I'm trying to prove a trivial lemma, which is a recreation of a situation I found myself in at another point. Lemma Sn_neq_n: forall n, S n <> n. The proof seems as simple as it gets: Proof. ...
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Inheriting Typeclasses of different Kinds in Coq

This is kind of a follow-up to my previous question: Multiple Typeclass Inheritance in Coq, but this is about typeclasses that expect different Kinds (in Haskell terms, I guess?). I have a typeclass, ...
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Multiple Typeclass Inheritance in Coq

I've been trying to create a small typeclass hierarchy in Coq and I haven't been able to progress despite there being a few answers on stackoverflow that I thought would be the solution, particularly ...
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Using dependent types in Coq (safe nth function)

I'm trying to learn Coq, but I find it hard to make the leap from what I read in Software Foundations and Certified Programming with Dependent Types to my own use cases. In particular, I thought I'd ...
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24 views

Why can't inversion be used on a universally qualified hypothesis in Coq?

I've been going through the Software Foundations course and found the following proof (source link). Theorem not_exists_dist : excluded_middle -> forall (X:Type) (P : X -> Prop), ~ ...
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How can I do intros in a different order without using generalize dependent in Coq?

Given that I have forall n m, is there a way to this: intros n m. generalize dependent n. But in a single step, by only applying intros (or an alternative tactic) just to m?
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48 views

How to do pseudo polynomial divisions in Coq/Ssreflect

Basically, I want to observe the result of pseudo polynomial division on some instances (say 3 x^2+2 x +1 and 2 x +1). Pseudo division between polynomials is implemented in edivp in polydiv.v in ...
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Is there a way to prove properties about my C++ programs?

I understand how languages like Coq and Idris can be used to prove properties of programs written in those languages (judging by my little experience in the subject.), but I wonder if there's an ...
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61 views

Tactic failure: Use forward_call W. method signature

I try to verify my program with VST. I've got a weird error message: Coq < Check ( (sh, n, guess-1, vn, Vint (Int.sub (Int.repr guess) (Int.repr 1)))). > (sh, n, guess - 1, vn, Vint (Int.sub ...
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How to apply theorems for definitions with restrictions in coq

I found a number of examples of definitions with restrictions in coq. Here is for example a variation of the pred function: Lemma Lemma_NotZeroIsNotEqualToZero : ~ 0 <> 0. Proof. omega. Qed. ...
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How to prove (R -> P) [in the Coq proof assistant]?

How does one prove (R->P) in Coq. I'm a beginner at this and don't know much of this tool. This is what I wrote: Require Import Classical. Theorem intro_neg : forall P Q : Prop,(P -> Q /\ ~Q) ...
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How to make Coq evaluate a specific redex (or - why does it refuse in this case?)

When I am trying to prove a theorem about a recursive function (see below), I end up at a reducible expression (fix picksome L H := match A with .... end) L1 H1 = RHS I would like to expand the ...
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How to duplicate a hypothesis in Coq?

during a proof, I encounter a hypothesis H. I have lemmas: H -> A and H -> B. How can I duplicate H in order to deduce two hypotheses A and B? edited: More precise: I've got: lemma l1: X -> A. ...
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Why Coq doesn't allow inversion, destruct, etc. when the goal is a Type?

When refineing a program, I tried to end proof by inversion on a False hypothesis when the goal was a Type. Here is a reduced version of the proof I tried to do. Lemma strange1: forall T:Type, 0>0 ...