Coq is an interactive theorem prover.

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Heterogenous list in Coq

I'm considering writing a Coq program to verify certain properties of relational algebra. I've got some of the basic data types working, but concatenating tuples is giving me some trouble. Here's the ...
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Transforming a inductive value into an inductive value of another type

In database theory, one assumes the existence of two disjoint sets containing variables and constants. I want to make the distinction between variables and constants at the type level of my values, ...
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Why is the function addpos defined this way?

The following is the definition of the function addpos which defines addtition of a natural number to an integer. What is puzzling is the fact that here when n is matched with 0, addpos x2 0 gives ...
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What does fun keyword do in Coq?

I am struggling to understand the meaning of keyword 'fun' in Coq. There are types all and function forallb: Inductive all (X : Type) (P : X -> Prop) : list X -> Prop := | all_nil : all X P ...
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Coq: Prop versus Set in Type(n)

I want to consider the following three (related?) Coq definitions. Inductive nat1: Prop := | z1 : nat1 | s1 : nat1 -> nat1. Inductive nat2 : Set := | z2 : nat2 | s2 : nat2 -> nat2. ...
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What does positive_to_Qpositive_i in the QArithSternBrocot library do?

I am going through the code Q_denumerable.v in library QArithSternBrocot and this is what I came across. Fixpoint positive_to_Qpositive_i (p:positive) : Qpositive := match p with | xI p => ...
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Applying hypotesis to a variable

Let's say I'm in the middle of a proof and I have hypotheses like these: a : nat b : nat c : nat H : somePred a b and the definition of somePred says: Definition somePred (p:nat) (q:nat) : Prop := ...
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How to prove False from obviously contradictory assumptions

Suppose I want to prove following Theorem: Theorem succ_neq_zero : forall n m: nat, S n = m -> 0 = m -> False. This one is trivial since m cannot be both successor and zero, as assumed. ...
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Coq QArith division by zero is zero, why?

I noticed that in Coq's definition of rationals the inverse of zero is defined to zero. (Usually, division by zero is not well-defined/legal/allowed.) Require Import QArith. Lemma inv_zero_is_zero: ...
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Coq induction on modulo

I'm new with coq and i really have difficulty in applying the induction. as long as I can use theorems from the library, or tactics such as omega, all this is "not a problem". But as soon as these do ...
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Coq tutorial and/or book with exercises involving subset types

Is there a Coq tutorial and/or book with discussion and exercises involving subset types, as in the following SO question? Coq case analysis and rewrite with function returning subset types It ...
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Coq case analysis and rewrite with function returning subset types

I was working is this simple exercise about writing certified function using subset types. The idea is to first write a predecessor function pred : forall (n : {n : nat | n > 0}), {m : nat | S m ...
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Proving a Co-Inductive property (lexical ordering is transitive) in Coq

I'm trying to prove the first example in "Practical Coinduction" in Coq. The first example is to prove that lexicographical ordering on infinite streams of integers is transitive. I haven't been able ...
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Assignment of coq

I am a beginner with Coq, and I got this assignment recently. Can anyone give me a hint? The assignment is to use Coq to prove some properties. What is the strategies used in coq to prove. I know ...
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Apply native induction principle in coq with several arguments

I'm reading the book Software Foundation. On the chapter "More on Induction", the authors talk about the induction principle generated by coq when a inductive type is define. An exercice is the ...
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Defining function in Coq

Let assume that: Axiom inverse1: forall a:G, exists b:G, P a b. Axiom only_one: forall a b1 b2:G, P a b1 /\ P a b2 -> b1 = b2. These two axioms define a map G -> G. I want to define this ...
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60 views

De Bruijn indices in Isabelle and Coq

I would like to be able use something like de Bruijn indices in Isabelle or in Coq, in order to refer to variables that have been introduced by quantifiers. For example, instead of writing: forall x. ...
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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. pal is defined as follow : Inductive pal {X:Type} ...
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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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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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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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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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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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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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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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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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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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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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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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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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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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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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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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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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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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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 } ...