# 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.

2,906
questions

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### Multiple Assignements in a Coq Map to the same value

I'm given the following definition of com that sssigns new values to more than one variable in a single command.:
Inductive com : Type :=
| CSkip
| CAsgn (xs : list string) (es : list aexp) (* <...

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0
answers

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### Unable to install Coq-Polyhedra

I am triying to install the library Coq-Polyhedra(https://github.com/Coq-Polyhedra/Coq-Polyhedra) but since it requires their local-branch from mathcomp and mathcomp-finite-map I am unable to get the ...

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1
answer

47
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### Decider for lists In Fixpoint

I am relatively new to coq and i am not sure how to procede here.
I want to write a decidability function for the In Fixpoint of the list library like this:
Program Fixpoint InDec (s : K) (l : list K) ...

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0
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### VSCoq Error: Connection to server got closed. Server will not be restarted

I am using VSCoq with Ubuntu and WSL for a Formal Methods class I am taking this semester. I had it working fine (a trial in and of itself), but am all of a sudden receiving the following errors:
[...

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1
answer

49
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### How do I move a let variable to a separate hypothesis?

In Coq, as a simplified example (using False to ignore the conclusion),
Theorem example
(f : nat -> bool)
(g : bool -> bool -> bool)
(cmplx :=
let a := f 0 in
let b := ...

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1
answer

32
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### Coq inductive not right form

I have troubles with a not well formed IH (or I am making mistakes).
From stdpp Require Import mapset.
From stdpp Require Import gmap.
From stdpp Require Import options.
From stdpp Require Import ...

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3
answers

85
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### How can I handle this `false = true` case?

I am trying to prove the following lemma.
Inductive bool : Type :=
| true
| false.
Lemma andb_true_iff : forall b1 b2 : bool,
b1 && b2 = true <-> b1 = true /\ b2 = true.
Proof.
...

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1
answer

30
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### Why can't I destruct or discriminate here?

I am proving the following theorem.
Definition excluded_middle := forall P : Prop,
P \/ ~ P.
Theorem not_exists_dist :
excluded_middle ->
forall (X:Type) (P : X -> Prop),
~ (exists x, ...

0
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1
answer

30
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### Why I can't use exact P if P is a Prop?

I am trying to prove contraposition. And my proof is like the following. It doesn't work.
Theorem contrapositive : forall (P Q : Prop),
(P -> Q) -> (~Q -> ~P).
Proof.
intros.
destruct ...

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1
answer

42
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### Why can't I perform rewrite tactic here?

I have already a theorem
Theorem plus_id_example : forall n m:nat,
n = m ->
n + n = m + m.
and I want to prove its "reverse form". So I have
Theorem plus_n_n_injective : forall n m,
...

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1
answer

27
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### Why we can't use "simpl" on `j = j -> x = y`?

I am trying to solve the injection_ex3 exercise in Software Foundation Volume 1.
I have the following prove
Example injection_ex3 : forall (X : Type) (x y z : X) (l j : list X),
x :: y :: l = z :: j ...

0
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1
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59
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### Coq Decision Diagram Multivalued Function

I am trying to accomplish something but am stuck.
To begin with, my work is based on a List Decision Diagram. This represents a multi-valued input binary output function.
Here, assume we have natural ...

1
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1
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### Coq : Using a parametrized Type from within a Module

I'm trying to use Modules in my project and I made this small example to show what I'm struggling with.
Module Type A.
Parameter t : Type.
End A.
Module a : A.
Definition t := nat.
End a.
Module ...

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1
answer

49
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### Prove theorem about the last element of a list

I’ve two functions build_goal_aux and last defined like this:
Require Import List.
Import ListNotations.
Fixpoint build_goal_aux (acc:list nat)(n:nat) : list nat :=
match n with
| O => acc
| ...

1
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1
answer

51
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### How do I apply (S n' <=? m) = true to S n' <= m? [closed]

Trying to complete a Coq proof but I ended up getting stuck on the last goal. I transformed the goal to S n' <= m and have a hypothesis (S n' <=? m) = true, but am unable to unify these.
I tried ...

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1
answer

70
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### Software Foundations (lf): proving leb_plus_exists and plus_leb_exists

I've been working through Volume 1 of Software Foundations, and I can't get past a pair of optional questions in Logic.v. Anyone have any idea what to do?
Theorem leb_plus_exists : forall n m, n <=?...

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1
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42
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### Coq/Ltac: is it possible to design a tactic that says the goal is proved when a decision procedure proves it, without the proof term?

I am designing a Coq tactic that calls a decision procedure, which answers yes/no, without giving a proof term. When I get yes, I would like to say Ltac that the goal is proved.
Is there a way to do ...

1
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1
answer

50
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### Proving some theorems on the function index in Coq

I’m trying to implement an index function in Coq. I’ve written this code:
Notation grid := (list nat).
Fixpoint index_aux (n : nat) (g : grid) (i : nat) : option nat :=
match g with
| [] => ...

0
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1
answer

74
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### How to prove this in Coq

Lemma x: forall P Q: Set -> Prop,
forall f: Set -> Set,
forall x, (P x -> Q (f x)) ->
(exists x, P x) -> (exists x, Q x).
I try to do it many ...

0
votes

1
answer

48
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### Why does coq not recognize that `None = Some v` is false?

I have a function:
Fixpoint eval (fuel : nat) (env : environment) (e : exp) :=
match fuel with
| 0 => None
| S fuel' => (...)
end
I'm now proving a property of such ...

2
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0
answers

41
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### How to make Spoq generate high-level specifications in Coq (not just AST) for the functions in LLVM IR

I am trying to use Spoq framework (and on GitHub) to translate code from C to Coq.
I faced problem - I am getting only low-level specifications for my functions (just AST), but I want to get high-...

0
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1
answer

32
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### Does import not only import but also change existing definitions?

Using the following Coq code:
Search "prod_uncurry_subdef".
Require Import Arith.
Search "prod_uncurry_subdef".
prints out the following:
prod_uncurry_subdef: forall [A B C : Type]...

0
votes

1
answer

62
views

### In Coq, what would be the steps to prove the correctness of a function that solves puzzles like Sudoku or Takuzu?

What would be the general steps to prove the correctness of a function that solves puzzles, for example Sudoku or Takuzu?

2
votes

0
answers

57
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### How to define a recursive notation with overlapping production?

I am working with labelled transition systems and I want to conveniently express sequences of transitions. I defined the transition type as Inductive Trans : Label -> State -> State -> Prop ...

0
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1
answer

34
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### Dependent equality with 2 different type functions

How do you work with dependent types where the function making the type differs?
I'm working on a problem where I have 2 dependent types where the
types are indexed in different ways. I want to show ...

0
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3
answers

145
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### Efficient Record Construction in Coq: Is Direct Proof Inclusion Possible?

I want to define a small record in Coq which also includes certain conditions. In addition I want a definition to create a record in an easy way. Here is my approach:
Require Import Arith.
(* Define ...

2
votes

1
answer

80
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### Equivalence of inductive and recursive

I have two definitions for factorial of a natural number. One is an inductive definition and the other is a fixpoint. I would like to prove the equivalence of these two definitions, but haven't been ...

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1
answer

59
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### Iris/Coq replacing literal

I am using Iris for Coq, but I am stuck on something.
Here, I want to get the snd value, l', from hd'. Then I can use IH with Hl and Hphi to finish the goal. Does anyone know how to replace hd' in ...

1
vote

1
answer

130
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### How to prove (X × Y = ∅) <-> (X = ∅) ∨ (Y = ∅)

I wish to prove the lemma below using Coq and mathcomp.classical_sets.
Let A × B - product of some sets, i.e. {(z1, z2) | z1 ∈ A /\ z2 ∈ B}
Then (A × B = ∅) <-> (A = ∅) ∨ (B = ∅)
My proof is ...

0
votes

1
answer

113
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### How to prove that nat_to_bin combines bin_to_nat b = normalize b in Coq

I am a green hand in studying Coq with the reference book softwarefoundation-induction
In the last part of this phrase, there is an exercise about proving that
change a binary to a nature number and ...

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3
answers

84
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### How do I install a library in coq? (MacOS)

I'm trying to work with the mathcomp library in VSCoq. I followed the installation instructions on the library website.
opam repo add coq-released https://coq.inria.fr/opam/released
opam install coq-...

0
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1
answer

95
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### How to prove an inequality

How do I prove this in Coq? Tactic "omega" does not work. Neither does "lia".
Require Import ZArith.
Require Import Psatz.
Open Scope Z.
Lemma ge1:
forall b k: Z,
b>=1 -> k&...

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2
answers

93
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### How to prove the goals in more elegant way using ssreflect?

It seems my coq proofs are longer and uglier than expected and I can't achieve ssreflect advantages in them despite my attempts. I think I missed some key points. Or maybe I just need to know more ...

0
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1
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54
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### Coq code in LaTeX using lstcoq does not work

I want to format Coq code using the LaTeX package "lstcoq.sty". It used to work for me a few years ago, but now I get an error message when trying to use it again. The Coq code inserted in ...

0
votes

1
answer

90
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### How to continue case analysis of a nested match in coq?

I recently got a goal from coq (Actually I get this goal from case analysis):
1 goal (ID 110)
addr : nat
x : State
l : list nat
Heqo : write_list_index (repeat 0 (addr + 1)) addr 0 = Some l
...

0
votes

1
answer

39
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### Coq: Is there a way to define "map" for Ensemble

Is there a way to apply a function to a set in Coq using Ensemble?
That is, to define a function that takes a function f : A -> A and a set S : Ensemble A and returns an Ensemble A such that for a ,...

0
votes

3
answers

169
views

### Why is `specialize` not an invalid tactic within a proof?

In the software foundations book (archived) the specialize tactic was introduced as a way to simplify a hypothesis.
I don't understand,why it's a valid step within a proof.
The provided example adds ...

0
votes

1
answer

81
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### How to reason about sets in Coq? - Defining Complete Lattices

I defined a Lattice typeclass in Coq:
Class PartialOrder A : Type := {
le : A -> A -> Prop;
}.
Notation "x <= y" := (le x y).
Class Lattice A `{PartialOrder A} : Type := {
...

1
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1
answer

31
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### Custom tactics provided by libraries

Is there a way to see all custom tactics provided by a library from inside Coq?
Searching for them using Search does not work.

0
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1
answer

39
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### Can't find Lemma for set equality in stdpp library

I am using the stdpp library and I want to show the equality of these two sets:
{[x0]} ∪ dom X = {[x0]} ∪ dom Y
However, I cannot find a lemma in stdpp to reduce the problem to:
dom X = dom Y
which ...

0
votes

2
answers

50
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### True in Goal State Coq

While attempting to prove All in Software Foundations Volume 1, Logic.v, I came across a proof state of simply True. I.e. my proof state looks like:
T : Type
P : T -> Prop
H : forall x : T, False -...

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1
answer

59
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### Forward leads to stack-overflow

I'm trying to prove the correctness of an implementation of inserting a value in a sorted list. I have proved useful lemmas related to inserting a value in a sorted list and now I'm moving forward ...

0
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2
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70
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### How to prove forall x y, x<=y -> div2 x <= div2 y in coq?

I would like to prove this lemma “forall x y, x<=y -> div2 x <= div2 y” in coq by induction, however I got stucked.
How can I prove this by induction? Thanks!
I tried to prove by induction ...

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2
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55
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### Is there a three-valued case analysis on patterns (a < b) (a = b) (a > b)?

I want my students to prove some stuff overs Binary Search Trees.
Most of the proofs require to perform a case analysis on some arithmetic inequality over three cases:
a < b (recursive call in the ...

0
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1
answer

66
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### Cannot infer the type of function in environment

I am trying to implement binary decision diagrams in Coq. I want to create BDDs using 2CNF formulas.
First, the imports;
Require Import Coq.Lists.List.
Require Import Coq.Init.Nat.
Require Import Coq....

0
votes

0
answers

633
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### vscoq language server failed installing

I was following the installation guide from the main github page for installing the vscoq 2 beta release:
https://github.com/coq-community/vscoq
I am running it on WSL 2 Ubuntu on Windows 10.
<>&...

1
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0
answers

34
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### Understanding TLC's finite map library

I'm trying to use TLC's finite maps to model heaps in separation logic, after going through Separation Logic Foundations. It's quite different from the finite map library used there though. For ...

0
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1
answer

37
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### How to represent 2D array in Verifiable C

I have a 2D array unsigned int a[10][10], and would like to represent it in the SEP clause.
I get the first part as data_at sh2 (tarray (tarray tuint 10) 10) but am confused about the second part. For ...

0
votes

3
answers

105
views

### How to proof by natural number case analysis in Coq?

I am stucked by a proof using coq. I have the following definitions:
Require Import List.
Require Import Nat.
Fixpoint Inb(x: nat) (A: list nat) :=
match A with
| nil => false
| h :: t => if ...

0
votes

2
answers

87
views

### false = true problem when solving Lemma in Coq

I have definition:
Definition f (b1 b2 : bool) :bool :=
match b1 with
| true => true
| false => b2
end.
And Lemma...
Lemma l1: forall p : bool, f p false = true.
What I have tried is this:
...