Coq is an interactive theorem prover.

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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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20 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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2answers
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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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1answer
40 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 ...
6
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1answer
97 views

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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1answer
48 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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1answer
37 views

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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1answer
27 views

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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1answer
35 views

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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2answers
25 views

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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1answer
43 views

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 ...
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1answer
24 views

Coq: keeping information in a match statement

I'm building a recursive function that does a match on a list l. In the cons branch I need to use the information that l = cons a l' in order to prove that the recursive function terminates. However, ...
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1answer
17 views

Showing terminating recursion for cumsum in Coq

I want to prove that computing the cumulative sum between a and b terminates. I use an Acc lt x term to show that the recursion decreases, like this Require Import Omega. Lemma L1 : forall a b, ...
0
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1answer
13 views

How to obtain a FMapInterface.In from a FMapInterface.MapsTo and vice-versa?

From the manual FMapInterface.In is defined as: Definition In (k:key)(m: t elt) : Prop := exists e:elt, MapsTo k e m. So, I was expecting that unfolding a term In k m would yield exists e, MapsTo k ...
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1answer
25 views

Coq induction start at specific nat

I'm trying to learn coq so please assume I know nothing about it. If I have a lemma in coq that starts forall n m:nat, n>=1 -> m>=1 ... And I want to proceed by induction on n. How do I ...
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1answer
14 views

How to compile modules inside directories (aka with dots in its name)

I would like to import a module as Require Import Foo.Bar. Given that I have a file Bar.v inside directory Foo. I am currently compiling this module with: $ coqc Foo/Bar.v When I try to ...
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1answer
27 views

Case based proof using nat comparisons in COQ

I am currently trying to prove something like this: 1 subgoals a : nat IHa : {x : nat | something_with a x} ______________________________________(1/1) {x : nat | something_with (S a) x} The ...
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1answer
61 views

Generating Haskell code from COQ: Logical or arity value used

I am currently trying to generate Haskell code from my program verification lemma, which looks like this: Lemma the_thing_is_ok : forall (e:Something), Matches e (calculate_value e). Right after ...
0
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2answers
53 views

How to prove this simple equation in Coq

I want to prove in Coq that: convert l' + 1 + (convert l' + 1) = convert l' + convert l' + 1 + 1 only some parentheses is redundant and do not let me use reflexivity command; so what should I do? ...
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1answer
18 views

Using sets as hyphotesis and goal in COQ

How exactly could a proof like the following be completed? 1 subgoals IHt1 : {t' : some_type | something_using t'} IHt2 : {t' : some_type | something_else_using t'} ...
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1answer
20 views

Well-founded recursion using (Acc lt (x-y))

In A Tutorial on[Co-]Inductive Types in Coq on p. 47, a recursive function is defined, where each recursive step uses a well-formedness proposition to show that the recursion terminates. A function ...
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1answer
29 views

Eliminating cases with propositions in Coq

Given an obvious definition of a natural number list type, and a function last that takes the last element or returns a default, I'm trying to prove the following lemma: Lemma last_ignores_first : ...
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2answers
38 views

Change a function at one point

I have two elements f : X -> bool and x : X. How to define g : X -> bool such g x = true and g y = f y for y != x.
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1answer
24 views

Prove equality on Sigma-types

I have defined a Sygma-Type that looks like: { R : nat -> bool | Reflexive R } I have two elements r1 r2 : { R : nat -> nat -> bool | Reflexive R } and I and to prove r1 = r2. How can I do ...
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1answer
28 views

Apply a function to both sides of an equality in Coq?

I'm in Coq trying to prove that Theorem evenb_n__oddb_Sn : ∀n : nat, evenb n = negb (evenb (S n)). I'm using induction on n. The base case is trivial, so I'm at the inductive case and my goal ...
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2answers
50 views

How to prove antisymmetric in coq

Define relation [<=] on natural numbers by saying that [m <= n] holds if there is a number [k] such that [m = k + n]. Reflexive and transitive have been proved. reflexive: ref: forall ...
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1answer
22 views

“Rewrite” a type

I have the following Coq code: Set Implicit Arguments. Record eq {X : Set} (R : X -> X -> Prop) : Set := mkEq { reflexivity: forall x, R x x }. Record eqSet : Type := make { set ...
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1answer
17 views

Redundant clause in match

When I run he following script: Definition inv (a: Prop): Prop := match a with | False => True | True => False end. I get "Error: This clause is redundant." Any idea why this happens? Thanks, ...
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0answers
30 views

Error while making ynot (library for Coq) in Ubuntu 14.04

I am trying to install - a library for the Coq proof assistant ( http://ynot.cs.harvard.edu/ ), which I am getting from here: https://github.com/Ptival/ynot (as I believe it is fixed for 8.4pl2) I ...
0
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1answer
52 views

Curry-Howard isomorphism definitions in Coq using fun

I'm having some issues with defining in Coq, more specifically when defining using the CHI. I have managed to gain the understanding of basic principals but when I try to define this" ((A -> (A ...
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1answer
19 views

How to access the elements of a record in coq

Suppose I have a record Record ToyModel:={ universe:Set; aNiceProperty:universe->Prop; color:universe->nat }. I would like to define a notion of compatibility for elements of type ToyModel. ...
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54 views

Type hierarchy definition in Coq or Agda

I would like to build a kind of type hierarchy: B is of type A ( B::A ) C and D are of type of B (C,D ::B) E and F are of type of C (E,F ::C) I asked here if this is possible to be ...
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1answer
33 views

vector reflexivity under setoid equality using CoRN MathClasses

I have a simple lemma: Lemma map2_comm: forall A (f:A->A->B) n (a b:t A n), (forall x y, (f x y) = (f y x)) -> map2 f a b = map2 f b a. which I was able to prove using ...
0
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1answer
15 views

Declaring a well colored digraph in coq

I would like to declare a structure in coq which represents a digraph which is well colored. I declared a Register which is accepted by coq if I don't have a condition. However I tried many ways of ...
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2answers
21 views

Dependent type list concatenation in Coq

I have a graph with objects and arrows and from this I have defined the notion of a path of arrows. I want to define concatenation of these paths. The following code is my naive attempt. But I get ...
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2answers
32 views

How to “flip” an equality proposition in Coq?

If I'm in Coq and I find myself in a situation with a goal like so: ================== x = y -> y = x Is there a tactic that can can take care of this in one swoop? As it is, I'm writing ...
3
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3answers
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A theorem prover / proof assistant supporting (multiple) subtyping / subclassing [closed]

In short, I am looking for a theorem prover which its underlying logic supports multiple subtyping / subclassing mechanism.( I tried to use Isabelle, but it does not seem to provide a first class ...
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1answer
30 views

Using length of list X as an argument for a constructor of X in Coq

The title is not very informative, so let me explain. I'm trying to formalize what it means to be a term in first-order logic. Here is the textbook definition of terms of an arbitrary language L: ...
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1answer
55 views

OS X `rlwrap coqtop` not working

rlwrap is a good program handling arrow keys in REPL loop. In most cases it works. For example rlwrap sbcl, rlwrap sml, and so on. But when it comes to rlwrap coqtop, it fails. The error information ...
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3answers
31 views

Coq notation for multi type list

Here is a contrived multi type list: Inductive Apple : Set :=. Inductive Pear : Set :=. Inductive FruitList : Set := | Empty | Cons_apple (a : Apple) (p : FruitList) | Cons_pear (p : Pear) (p: ...
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1answer
23 views

Applying tactics to local subgoals of a semicolon chain in Coq

Suppose we had the definitions Inductive sillyA : nat -> Prop := | sA0 : sillyA 0 | sA1 : sillyA 1. Inductive sillyB : nat -> Prop := | sB0 : sillyB 0 | sB1 : sillyB 1. Inductive sillyC (n : ...
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3answers
44 views

What does `omega` really do here?

This proof can be finished with a single omega: a : Z b : Z H : a > 1 H0 : b > 1 H1 : b ...
2
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2answers
68 views

How to build an inductive type for cobordisms using Coq?

I am trying to build an inductive type for cobordism using Coq in such way that some properties of cobordism (1-groupoid and 2-groupoid) can be proved. I am using the following Coq code: Unset ...
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1answer
48 views

GCD and mod in Coq

I'm stuck at a problem in Coq, would be great if anyone had any tips on how to break the problem down into smaller steps. The lemma is this: Lemma gcd_prime : forall (a b : Z), a > 1 -> b > ...
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1answer
68 views

How or is that possible to prove or falsify `forall (P Q : Prop), (P -> Q) -> (Q -> P) -> P = Q.` in Coq?

I want to prove or falsify forall (P Q : Prop), (P -> Q) -> (Q -> P) -> P = Q. in Coq. Here is my approach. Inductive True2 : Prop := | One : True2 | Two : True2. Lemma True_has_one : ...
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1answer
21 views

Defining a predicate without specifying its truth condition in Coq

I'm trying to use Coq for some simple kinds of philosophical predicate logic. Suppose, for instance, that I wanted to express the statement "if a being is human, it is not perfect" in Coq. I will ...
2
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27 views

Coq: “dependent induction” inside Ltac

Dependent induction seems to work differently for me in an Ltac and not. The following works just fine: Require Import Coq.Program.Equality. Goal forall (x:unit) (y:unit), x = y. intros. dependent ...
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1answer
62 views

How to prove “~(nat = False)”, “~(nat = bool)” and “~(nat = True)” in coq

The following two propositions are easy to prove. Theorem nat_eq_nat : nat = nat. Proof. trivial. Qed. Theorem True_neq_False : ~(True = False). Proof. unfold not. intros. symmetry in H. ...
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1answer
23 views

Omitting forall in Coq

I found the source code of an interesting logical theorem that I want to work through. But when I run it in CoqIDE, it gets stuck near the very beginning. Inductive Term: Set := K: Term | S: ...
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1answer
22 views

Simple proof of stream of ones in Coq

Taking code from CPDT, I'd like to prove a property for the easy stream ones, which always return 1. CoFixpoint ones : Stream Z := Cons 1 ones. Also from CPDT, I use this function to retrieve a ...