Coq is an interactive theorem prover.

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22 views

### How to automatically introduce symmetries into Coq hypotheses?

I have some equalities (=) and unequalities (<>) in the hypotheses such as:
e : x2 = x1
n : x3 <> x1
I want to use tactics like assumption, but sometimes the expected (un)equality in ...

**2**

votes

**1**answer

20 views

### coq: A left-recursive notation must have an explicit level

I have seen a Coq notation definition for "evaluates to" as follows:
Notation "e '||' n" := (aevalR e n) : type_scope.
I am trying to change the symbol '||' to something else as || is often times ...

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vote

**3**answers

39 views

### How to execute a computation exactly once in Coq?

I have a proof below with three more sub-goals to go. The proof is about the correctness of optimizing away plus 0 (optimize_0plus) in a simply arithmetic language demonstrated here. aexp is ...

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votes

**1**answer

14 views

### Cannot rewrite subterm in Coq

I have a proof in Coq where one of the hypothesis is:
H : m = pred q * n + (r + n)
And I have a proven lemma which states:
Lemma suma_conmutativa: forall m, forall n, m + n = n + m.
Where + is ...

**3**

votes

**1**answer

36 views

### Proof by case analysis in Coq

I am trying to prove a Proposition about the following function:
Program Fixpoint division (m:nat) (n:nat) {measure m} : nat :=
match lt_nat 0 n with
| false => 0
| true => match leq_nat n ...

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**1**answer

18 views

### Confused by COQ Imports

can someone please tell me the differences in COQ between
Require Name.
Require Import Name.
Import Name.

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votes

**1**answer

33 views

### Proving Gauss' theorem for nat in Coq

I'd like to prove Gauss' theorem for nat.
In plain (non-precise) language it says: if a divides b*c and none of a's factors are in b then they must all be in c.
Require Import NPeano.
Theorem ...

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**1**answer

27 views

### Coq calculational style biconditional chain

I am trying to prove a biconditional in Coq:
P <-> Q
And I wrote down a proof that has this structure:
P
<->
S
<->
T
<->
Q
thus: P <-> Q
How can I mimic this ...

**1**

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**1**answer

43 views

### Behaviour of the apply tactic when the goal and the applied term match

Suppose we have A B C : Prop.
Given a context with H : A -> B -> C and a single goal A -> B -> C,
why is it possible to apply H to finish the proof, solving the current and only goal?
I ...

**1**

vote

**2**answers

30 views

### Coq proof tactics

I am a beginner at Coq proof system (about 4 days). I've tried hard, but I am not able to prove the following.
forall a b c : nat, S (S (a + b)) = S (S (a + c)) -> b = c.
As far as I know, we ...

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votes

**2**answers

35 views

### Equality in COQ for enumerated types

I have a finite enumerated type (say T) in COQ and want to check elements for equality. This means, I need a function
bool beq_T(x:T,y:T)
The only way I managed to define such a function, is with ...

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vote

**0**answers

13 views

### Printing a message only if a tactic succeeds

Is there a way to print (using idtac?) a message in Ltac only after a command succeeds? Something like
first [ a; idtac "a did it!" | b; idtac "b did!" | idtac "nope"; fail ]
This almost works, ...

**2**

votes

**1**answer

26 views

### Defining interval function in Coq

I am trying to define a function in Coq called interval that given two natural numbers computes the list of all natural numbers between these two. However my definition is not primitive-recursive. ...

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17 views

### How to let COQ write complete proof log?

I want COQ to log all its subgoals while executing a proof.
The -verbose option of COQC did not give the proper result.
Second, is there an option that let COQ log all elementary tactics used by the ...

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vote

**2**answers

34 views

### Definition of normal form in coq

In the book Types and Programing Languages of B. Pierce, the author introduce a small language in order to introduce different concepts used through the book.
The language is the following:
t::=
...

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votes

**2**answers

32 views

### casting convertible types in coq

In the following:
Lemma test:
forall n j (jn : j < n) (ln : j + 0 < n) (P: forall {x} {y}, (x<y) -> nat),
P ln = P jn.
Types ln an jn seems to be convertible to each other ...

**1**

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**1**answer

35 views

### How to compile Logic.v in Coq

I'm using Coq 8.4pl6, and want to compile Logic.v (of Coq standard library) in Coq and to see its output as an example of module compiling and printing, but failed.
More specifically, tauto at line ...

**3**

votes

**1**answer

20 views

### Passing patterns to tactics

I'm writing a tactic that looks for the value associated to a key in a list of bindings. Something like:
Require Import String List Program.
Ltac assoc needle haystack :=
match haystack with
| ...

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vote

**1**answer

36 views

### Proving a theorem in Coq using almost only rewrites - no “cleverness”

I'm trying to formulate a problem so that only rewriting will be sufficient
to prove the goal. I want to avoid "clever" uses of Propositions and instead use
bools that can be computed by Coq.
I ...

**0**

votes

**1**answer

17 views

### Applying functional extensionality to functions with 2 arguments in Coq

I am trying to prove something like this:
(fun (i : nat) (ic : i < S n) => ...) = (fun (i : nat) (ip : i < S n) => ...)
It sounds like a task for apply functional_extensionality but it ...

**1**

vote

**2**answers

44 views

### Well founded recursion in Coq

I am trying to write a function for computing natural division in Coq and I am having some trouble defining it since it is not structural recursion.
My code is:
Inductive N : Set :=
| O : N
| S ...

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**2**answers

48 views

### How to introduce a new existential condition from a witness in Coq?

My question relates to how to construct an exist term in the set of conditions/hypotheses.
I have the following intermediate proof state:
X : Type
P : X -> Prop
H : (exists x : X, P x -> ...

**3**

votes

**1**answer

31 views

### How to use a custom induction principle in Coq?

I read that the induction principle for a type is just a theorem about a proposition P. So I constructed an induction principle for List based on the right (or reverse) list constructor .
Definition ...

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**1**answer

34 views

### How to apply a function once during simplification in Coq?

From what I understand, function calls in Coq are opaque.
Sometimes, I need to use unfold to apply it and then fold to turn the function definition/body back to its name. This is often tedious. My ...

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vote

**2**answers

28 views

### How to save the current goal / subgoal as an `assert` lemma

During a proof, I come to a situation where the current goal/subgoal turned out to be useful in a later stage of the same theorem.
Is there a tactic to "save" the current goal as a lemma as if the ...

**1**

vote

**1**answer

12 views

### How do I check for convertibility in a tactic producing terms?

Suppose I have the following tactic to check if a term is the literal zero:
Ltac isZero x :=
match x with
| O => constr:true
| _ => constr:false
end.
Goal Set.
let isz := isZero O in ...

**1**

vote

**1**answer

35 views

### Proving x >= a /\ x <= a -> x = a

How would one go about proving the following
Theorem T: forall x, a: nat, x >= a /\ x <= a -> x = a.
in Coq?

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votes

**1**answer

61 views

### Abstracting over the term … leads to a term … which is ill-typed

Here is what I am trying to prove:
A : Type
i : nat
index_f : nat → nat
n : nat
ip : n < i
partial_index_f : nat → option nat
L : partial_index_f (index_f n) ≡ Some n
V : ∀ i0 : ...

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vote

**3**answers

56 views

### How to introduce a new variable in Coq?

I was wondering if there is a way to introduce an entirely new variable during the proof of a theorem in Coq?
For a complete example, consider the following property from here about the evenness of ...

**1**

vote

**1**answer

27 views

### Can destruct used in implication in Coq?

destruct can be used to split and, or in Coq. But it seems can also be used in implication?
For example, I want to prove ~~(~~P -> P)
Lemma test : ~~(~~P -> P).
unfold not.
intro pffpf.
apply ...

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votes

**2**answers

38 views

### how to rearrange terms in Coq using plus communtativity and associativity?

I have a general question about how to rearrange terms in Coq. For example, if we have a term m + p + n + p, humans can quickly re-arrange the terms to something like m + n + p + p (implicitly using ...

**1**

vote

**2**answers

29 views

### Using `apply with` without giving names of parameters in Coq?

In using the Coq apply ... with tactic, the examples I have seen all involve explicitly giving the names of variables to instantiate. For example, given a theorem about the transitivity of equality.
...

**2**

votes

**1**answer

29 views

### Coq: How do I create a bool from a decidable Prop?

I want to structure my program as abstract modules, and write functions that use the abstract types. But I can't use match to destruct the abstract types, so I will have to create an inversion lemma ...

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**0**answers

18 views

### Calling a functor in with declaration

I wanted to implement sets of pairs of elements. For that, I copied the Make functor of MSetWeakList. It is originally defined like this:
Module Make (X: DecidableType) <: WSets with Module E := ...

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12 views

### MSets of different types interact badly

I wanted to use sets, and for that tried to use the MSets library. But I need to write functions from one type of set to another type of set, and it interacts badly with Coq's module system.
Here is ...

**3**

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**1**answer

29 views

### Prove that one hypothesis is negation of another in Coq

For example I have these two hypotheses (one is negation of other)
H : forall e : R, e > 0 -> exists p : X, B e x p -> ~ F p
H0 : exists e : R, e > 0 -> forall p : X, B e x p -> F p
...

**0**

votes

**1**answer

45 views

### How to make a Coq formalisation reusable?

I'm working in a Coq formalisation of an algorithm. But components of this algorithm (some functions and lemmas) can be "overloaded" (in Haskell sense) on distinct types.
My intention is to avoid ...

**3**

votes

**1**answer

38 views

### Termination implies existence of normal form

I would like to prove that termination implies existence of normal form. These are my definitions:
Section Forms.
Require Import Classical_Prop.
Require Import Classical_Pred_Type.
Context {A : ...

**1**

vote

**1**answer

71 views

### How to prove excluded middle is irrefutable in Coq?

I was trying to prove the following simple theorem from an online course that excluded middle is irrefutable, but got stuck pretty much at step 1:
Theorem excluded_middle_irrefutable: forall ...

**1**

vote

**1**answer

36 views

### Implications as functions in Coq?

I read that implications are functions. But I have a hard time trying to understand the example given in the above mentioned page:
The proof term for an implication P → Q is a function that takes
...

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**1**answer

31 views

### Modelling object-oriented program in Coq

I want to prove some facts about imperative object-oriented program. How can I represent a heterogeneous object graph in Coq? My main problem is that edges are implicit - each node consists of an ...

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votes

**1**answer

28 views

### Simplifying Rational Expressions and Proving Trivial Rational Equivalences in Coq

Which tactics can I use to perform simplifications of rational expressions and prove trivial rational equivalences as shown in the following example?
Require Import Coq.QArith.QArith.
Open Scope ...

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**1**answer

26 views

### Conversion of nat to Q in Coq

How can I convert nat to Q (Rational) in Coq?
I want to be able to write things like this:
Require Import Coq.QArith.QArith.
Open Scope Q_scope.
Definition a := 2/3.
When I try to do this, Coq ...

**4**

votes

**1**answer

68 views

### Is there a minimal complete set of tactics in Coq?

I have seen a lot of Coq tactics that are overlapping each other in function.
For example, when you have the exact conclusion in the hypothesis, you can use assumption, apply, exact, trivial, and ...

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vote

**2**answers

42 views

### How do we know all Coq constructors are injective and disjoint?

According to this course, all constructors (for inductive types) are injective and disjoint:
...Similar principles apply to all inductively defined types: all
constructors are injective, and the ...

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votes

**1**answer

58 views

### How to prove image equality for functions: x = y -> f x = f y in Coq?

Intuitively, I know that if x = y then f x = f y, for any function f. But I don't know how to prove this in Coq. What I have so far is:
Theorem eq_img: forall {X:Type} (f: X->X) (x y :X), x = y ...

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53 views

### How to prove False = 0<>0 [duplicate]

How can I prove
Goal False = (0<>0).
?
I tried omega, and I could not find any lemma that contains (False = ) or ( = False).

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vote

**2**answers

34 views

### How to return a (intro'd) hypothesis back to the goal formula?

For the proof:
Parameter A B : Prop.
Goal A->B.
intro A.
I get:
1 subgoals
A : A
______________________________________(1/1)
B
How do I return then A back to the goal section? To return to:
...

**2**

votes

**1**answer

31 views

### How to tell Proof General that “.csv” != “.v”

Every time I open a .csv file in an Emacs buffer, Proof General starts up (unless it's already started) and resets my windows. This really throws off my Emacs groove and needs to stop.
The only part ...

**1**

vote

**1**answer

47 views

### injectivity of inl and inr in standard library

Where in the Coq standard library can I find a lemma stating that inl and inr are injections? That is, forall (A B : Type)(x y : A), inl B x = inl B y -> x = y, and analogously for the right-hand ...